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robustlib.h @ 1336

Revision 1336, 73.6 kB (checked in by sindj, 14 years ago)
Sampling dokoncen, zbyva logaritmovat normalizacni faktor a testovat. JS

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1	/*!
2	\file
3	\brief Robust Bayesian auto-regression model
4	\author Jan Sindelar.
5	*/
6
7	#ifndef ROBUST_H
8	#define ROBUST_H
9
10	#include <stat/exp_family.h>
11	#include <itpp/itbase.h>
12	#include <map>
13	#include <limits>
14	#include <vector>
15	#include <list>
16	#include <set>
17	#include <algorithm>
18
19	using namespace bdm;
20	using namespace std;
21	using namespace itpp;
22
23	const double max_range = 10;//numeric_limits<double>::max()/10e-10;
24
25	/// An enumeration of possible actions performed on the polyhedrons. We can merge them or split them.
26	enum actions {MERGE, SPLIT};
27
28	// Forward declaration of polyhedron, vertex and emlig
29	class polyhedron;
30	class vertex;
31	class emlig;
32
33
34	/*
35	class t_simplex
36	{
37	public:
38	set<vertex*> minima;
39
40	set<vertex*> simplex;
41
42	t_simplex(vertex* origin_vertex)
43	{
44	simplex.insert(origin_vertex);
45	minima.insert(origin_vertex);
46	}
47	};*/
48
49	/// A class representing a single condition that can be added to the emlig. A condition represents data entries in a statistical model.
50	class condition
51	{
52	public:
53	/// Value of the condition representing the data
54	vec value;
55
56	/// Mulitplicity of the given condition may represent multiple occurences of same data entry.
57	int multiplicity;
58
59	/// Default constructor of condition class takes the value of data entry and creates a condition with multiplicity 1 (first occurence of the data).
60	condition(vec value)
61	{
62	this->value = value;
63	multiplicity = 1;
64	}
65	};
66
67	class simplex
68	{
69
70
71	public:
72
73	set<vertex*> vertices;
74
75	double probability;
76
77	vector<multimap<double,double>> positive_gamma_parameters;
78
79	vector<multimap<double,double>> negative_gamma_parameters;
80
81	double positive_gamma_sum;
82
83	double negative_gamma_sum;
84
85	double min_beta;
86
87
88	simplex(set<vertex*> vertices)
89	{
90	this->vertices.insert(vertices.begin(),vertices.end());
91	probability = 0;
92	}
93
94	simplex(vertex* vertex)
95	{
96	this->vertices.insert(vertex);
97	probability = 0;
98	}
99
100	void clear_gammas()
101	{
102	positive_gamma_parameters.clear();
103	negative_gamma_parameters.clear();
104
105	positive_gamma_sum = 0;
106	negative_gamma_sum = 0;
107
108	min_beta = numeric_limits<double>::max();
109	}
110
111	void insert_gamma(int order, double weight, double beta)
112	{
113	if(weight>=0)
114	{
115	if(positive_gamma_parameters.size()<order+1)
116	{
117	multimap<double,double> map;
118	positive_gamma_parameters.push_back(map);
119	}
120
121	positive_gamma_sum += weight;
122
123	positive_gamma_parameters[order].insert(pair<double,double>(weight,beta));
124	}
125	else
126	{
127	if(negative_gamma_parameters.size()<order+1)
128	{
129	multimap<double,double> map;
130	negative_gamma_parameters.push_back(map);
131	}
132
133	negative_gamma_sum -= weight;
134
135	negative_gamma_parameters[order].insert(pair<double,double>(-weight,beta));
136	}
137
138	if(beta < min_beta)
139	{
140	min_beta = beta;
141	}
142	}
143	};
144
145
146	/// A class describing a single polyhedron of the split complex. From a collection of such classes a Hasse diagram
147	/// of the structure in the exponent of a Laplace-Inverse-Gamma density will be created.
148	class polyhedron
149	{
150	/// A property having a value of 1 usually, with higher value only if the polyhedron arises as a coincidence of
151	/// more than just the necessary number of conditions. For example if a newly created line passes through an already
152	/// existing point, the points multiplicity will rise by 1.
153	int multiplicity;
154
155	/// A property representing the position of the polyhedron related to current condition with relation to which we
156	/// are splitting the parameter space (new data has arrived). This property is setup within a classification procedure and
157	/// is only valid while the new condition is being added. It has to be reset when new condition is added and new classification
158	/// has to be performed.
159	int split_state;
160
161	/// A property representing the position of the polyhedron related to current condition with relation to which we
162	/// are merging the parameter space (data is being deleted usually due to a moving window model which is more adaptive and
163	/// steps in for the forgetting in a classical Gaussian AR model). This property is setup within a classification procedure and
164	/// is only valid while the new condition is being removed. It has to be reset when new condition is removed and new classification
165	/// has to be performed.
166	int merge_state;
167
168
169
170	public:
171	/// A pointer to the multi-Laplace inverse gamma distribution this polyhedron belongs to.
172	emlig* my_emlig;
173
174	/// A list of polyhedrons parents within the Hasse diagram.
175	list<polyhedron*> parents;
176
177	/// A list of polyhedrons children withing the Hasse diagram.
178	list<polyhedron*> children;
179
180	/// All the vertices of the given polyhedron
181	set<vertex*> vertices;
182
183	/// The conditions that gave birth to the polyhedron. If some of them is removed, the polyhedron ceases to exist.
184	set<condition*> parentconditions;
185
186	/// A list used for storing children that lie in the positive region related to a certain condition
187	list<polyhedron*> positivechildren;
188
189	/// A list used for storing children that lie in the negative region related to a certain condition
190	list<polyhedron*> negativechildren;
191
192	/// Children intersecting the condition
193	list<polyhedron*> neutralchildren;
194
195	/// A set of grandchildren of the polyhedron that when new condition is added lie exactly on the condition hyperplane. These grandchildren
196	/// behave differently from other grandchildren, when the polyhedron is split. New grandchild is not necessarily created on the crossection of
197	/// the polyhedron and new condition.
198	set<polyhedron*> totallyneutralgrandchildren;
199
200	/// A set of children of the polyhedron that when new condition is added lie exactly on the condition hyperplane. These children
201	/// behave differently from other children, when the polyhedron is split. New child is not necessarily created on the crossection of
202	/// the polyhedron and new condition.
203	set<polyhedron*> totallyneutralchildren;
204
205	/// Reverse relation to the totallyneutralgrandchildren set is needed for merging of already existing polyhedrons to keep
206	/// totallyneutralgrandchildren list up to date.
207	set<polyhedron*> grandparents;
208
209	/// Vertices of the polyhedron classified as positive related to an added condition. When the polyhderon is split by the new condition,
210	/// these vertices will belong to the positive part of the splitted polyhedron.
211	set<vertex*> positiveneutralvertices;
212
213	/// Vertices of the polyhedron classified as negative related to an added condition. When the polyhderon is split by the new condition,
214	/// these vertices will belong to the negative part of the splitted polyhedron.
215	set<vertex*> negativeneutralvertices;
216
217	/// A bool specifying if the polyhedron lies exactly on the newly added condition or not.
218	bool totally_neutral;
219
220	/// When two polyhedrons are merged, there always exists a child lying on the former border of the polyhedrons. This child manages the merge
221	/// of the two polyhedrons. This property gives us the address of the mediator child.
222	polyhedron* mergechild;
223
224	/// If the polyhedron serves as a mergechild for two of its parents, we need to have the address of the parents to access them. This
225	/// is the pointer to the positive parent being merged.
226	polyhedron* positiveparent;
227
228	/// If the polyhedron serves as a mergechild for two of its parents, we need to have the address of the parents to access them. This
229	/// is the pointer to the negative parent being merged.
230	polyhedron* negativeparent;
231
232	/// Adressing withing the statistic. Next_poly is a pointer to the next polyhedron in the statistic on the same level (if this is a point,
233	/// next_poly will be a point etc.).
234	polyhedron* next_poly;
235
236	/// Adressing withing the statistic. Prev_poly is a pointer to the previous polyhedron in the statistic on the same level (if this is a point,
237	/// next_poly will be a point etc.).
238	polyhedron* prev_poly;
239
240	/// A property counting the number of messages obtained from children within a classification procedure of position of the polyhedron related
241	/// an added/removed condition. If the message counter reaches the number of children, we know the polyhedrons' position has been fully classified.
242	int message_counter;
243
244	/// List of triangulation polyhedrons of the polyhedron given by their relative vertices.
245	set<simplex*> triangulation;
246
247	/// A list of relative addresses serving for Hasse diagram construction.
248	list<int> kids_rel_addresses;
249
250	/// Default constructor
251	polyhedron()
252	{
253	multiplicity = 1;
254
255	message_counter = 0;
256
257	totally_neutral = NULL;
258
259	mergechild = NULL;
260	}
261
262	/// Setter for raising multiplicity
263	void raise_multiplicity()
264	{
265	multiplicity++;
266	}
267
268	/// Setter for lowering multiplicity
269	void lower_multiplicity()
270	{
271	multiplicity--;
272	}
273
274	int get_multiplicity()
275	{
276	return multiplicity;
277	}
278
279	/// An obligatory operator, when the class is used within a C++ STL structure like a vector
280	int operator==(polyhedron polyhedron2)
281	{
282	return true;
283	}
284
285	/// An obligatory operator, when the class is used within a C++ STL structure like a vector
286	int operator<(polyhedron polyhedron2)
287	{
288	return false;
289	}
290
291
292	/// A setter of state of current polyhedron relative to the action specified in the argument. The three possible states of the
293	/// polyhedron are -1 - NEGATIVE, 0 - NEUTRAL, 1 - POSITIVE. Neutral state means that either the state has been reset or the polyhedron is
294	/// ready to be split/merged.
295	int set_state(double state_indicator, actions action)
296	{
297	switch(action)
298	{
299	case MERGE:
300	merge_state = (int)sign(state_indicator);
301	return merge_state;
302	case SPLIT:
303	split_state = (int)sign(state_indicator);
304	return split_state;
305	}
306	}
307
308	/// A getter of state of current polyhedron relative to the action specified in the argument. The three possible states of the
309	/// polyhedron are -1 - NEGATIVE, 0 - NEUTRAL, 1 - POSITIVE. Neutral state means that either the state has been reset or the polyhedron is
310	/// ready to be split/merged.
311	int get_state(actions action)
312	{
313	switch(action)
314	{
315	case MERGE:
316	return merge_state;
317	break;
318	case SPLIT:
319	return split_state;
320	break;
321	}
322	}
323
324	/// Method for obtaining the number of children of given polyhedron.
325	int number_of_children()
326	{
327	return children.size();
328	}
329
330	/// A method for triangulation of given polyhedron.
331	double triangulate(bool should_integrate);
332	};
333
334
335	/// A class for representing 0-dimensional polyhedron - a vertex. It will be located in the bottom row of the Hasse
336	/// diagram representing a complex of polyhedrons. It has its coordinates in the parameter space.
337	class vertex : public polyhedron
338	{
339	/// A dynamic array representing coordinates of the vertex
340	vec coordinates;
341
342	public:
343	/// A property specifying the value of the density (ted nevim, jestli je to jakoby log nebo ne) above the vertex.
344	double function_value;
345
346	/// Default constructor
347	vertex();
348
349	/// Constructor of a vertex from a set of coordinates
350	vertex(vec coordinates)
351	{
352	this->coordinates = coordinates;
353
354	vertices.insert(this);
355
356	simplex* vert_simplex = new simplex(vertices);
357
358	triangulation.insert(vert_simplex);
359	}
360
361	/// A method that widens the set of coordinates of given vertex. It is used when a complex in a parameter
362	/// space of certain dimension is established, but the dimension is not known when the vertex is created.
363	void push_coordinate(double coordinate)
364	{
365	coordinates = concat(coordinates,coordinate);
366	}
367
368	/// A method obtaining the set of coordinates of a vertex. These coordinates are not obtained as a pointer
369	/// (not given by reference), but a new copy is created (they are given by value).
370	vec get_coordinates()
371	{
372	return coordinates;
373	}
374
375	};
376
377
378	/// A class representing a polyhedron in a top row of the complex. Such polyhedron has a condition that differen tiates
379	/// it from polyhedrons in other rows.
380	class toprow : public polyhedron
381	{
382
383	public:
384	double probability;
385
386	vertex* minimal_vertex;
387
388	/// A condition used for determining the function of a Laplace-Inverse-Gamma density resulting from Bayesian estimation
389	vec condition_sum;
390
391	int condition_order;
392
393	/// Default constructor
394	toprow(){};
395
396	/// Constructor creating a toprow from the condition
397	toprow(condition *condition, int condition_order)
398	{
399	this->condition_sum = condition->value;
400	this->condition_order = condition_order;
401	}
402
403	toprow(vec condition_sum, int condition_order)
404	{
405	this->condition_sum = condition_sum;
406	this->condition_order = condition_order;
407	}
408
409	double integrate_simplex(simplex* simplex, char c);
410
411	};
412
413
414
415
416
417
418
419	class c_statistic
420	{
421
422	public:
423	polyhedron* end_poly;
424	polyhedron* start_poly;
425
426	vector<polyhedron*> rows;
427
428	vector<polyhedron*> row_ends;
429
430	c_statistic()
431	{
432	end_poly = new polyhedron();
433	start_poly = new polyhedron();
434	};
435
436	void append_polyhedron(int row, polyhedron* appended_start, polyhedron* appended_end)
437	{
438	if(row>((int)rows.size())-1)
439	{
440	if(row>rows.size())
441	{
442	throw new exception("You are trying to append a polyhedron whose children are not in the statistic yet!");
443	return;
444	}
445
446	rows.push_back(end_poly);
447	row_ends.push_back(end_poly);
448	}
449
450	// POSSIBLE FAILURE: the function is not checking if start and end are connected
451
452	if(rows[row] != end_poly)
453	{
454	appended_start->prev_poly = row_ends[row];
455	row_ends[row]->next_poly = appended_start;
456
457	}
458	else if((row>0 && rows[row-1]!=end_poly)\|\|row==0)
459	{
460	appended_start->prev_poly = start_poly;
461	rows[row]= appended_start;
462	}
463	else
464	{
465	throw new exception("Wrong polyhedron insertion into statistic: missing intermediary polyhedron!");
466	}
467
468	appended_end->next_poly = end_poly;
469	row_ends[row] = appended_end;
470	}
471
472	void append_polyhedron(int row, polyhedron* appended_poly)
473	{
474	append_polyhedron(row,appended_poly,appended_poly);
475	}
476
477	void insert_polyhedron(int row, polyhedron* inserted_poly, polyhedron* following_poly)
478	{
479	if(following_poly != end_poly)
480	{
481	inserted_poly->next_poly = following_poly;
482	inserted_poly->prev_poly = following_poly->prev_poly;
483
484	if(following_poly->prev_poly == start_poly)
485	{
486	rows[row] = inserted_poly;
487	}
488	else
489	{
490	inserted_poly->prev_poly->next_poly = inserted_poly;
491	}
492
493	following_poly->prev_poly = inserted_poly;
494	}
495	else
496	{
497	this->append_polyhedron(row, inserted_poly);
498	}
499
500	}
501
502
503
504
505	void delete_polyhedron(int row, polyhedron* deleted_poly)
506	{
507	if(deleted_poly->prev_poly != start_poly)
508	{
509	deleted_poly->prev_poly->next_poly = deleted_poly->next_poly;
510	}
511	else
512	{
513	rows[row] = deleted_poly->next_poly;
514	}
515
516	if(deleted_poly->next_poly!=end_poly)
517	{
518	deleted_poly->next_poly->prev_poly = deleted_poly->prev_poly;
519	}
520	else
521	{
522	row_ends[row] = deleted_poly->prev_poly;
523	}
524
525
526
527	deleted_poly->next_poly = NULL;
528	deleted_poly->prev_poly = NULL;
529	}
530
531	int size()
532	{
533	return rows.size();
534	}
535
536	polyhedron* get_end()
537	{
538	return end_poly;
539	}
540
541	polyhedron* get_start()
542	{
543	return start_poly;
544	}
545
546	int row_size(int row)
547	{
548	if(this->size()>row && row>=0)
549	{
550	int row_size = 0;
551
552	for(polyhedron* row_poly = rows[row]; row_poly!=end_poly; row_poly=row_poly->next_poly)
553	{
554	row_size++;
555	}
556
557	return row_size;
558	}
559	else
560	{
561	throw new exception("There is no row to obtain size from!");
562	}
563	}
564	};
565
566
567	class my_ivec : public ivec
568	{
569	public:
570	my_ivec():ivec(){};
571
572	my_ivec(ivec origin):ivec()
573	{
574	this->ins(0,origin);
575	}
576
577	bool operator>(const my_ivec &second) const
578	{
579	return max(*this)>max(second);
580
581	/*
582	int size1 = this->size();
583	int size2 = second.size();
584
585	int counter1 = 0;
586	while(0==0)
587	{
588	if((*this)[counter1]==0)
589	{
590	size1--;
591	}
592
593	if((*this)[counter1]!=0)
594	break;
595
596	counter1++;
597	}
598
599	int counter2 = 0;
600	while(0==0)
601	{
602	if(second[counter2]==0)
603	{
604	size2--;
605	}
606
607	if(second[counter2]!=0)
608	break;
609
610	counter2++;
611	}
612
613	if(size1!=size2)
614	{
615	return size1>size2;
616	}
617	else
618	{
619	for(int i = 0;i<size1;i++)
620	{
621	if((*this)[counter1+i]!=second[counter2+i])
622	{
623	return (*this)[counter1+i]>second[counter2+i];
624	}
625	}
626
627	return false;
628	}*/
629	}
630
631
632	bool operator==(const my_ivec &second) const
633	{
634	return max(*this)==max(second);
635
636	/*
637	int size1 = this->size();
638	int size2 = second.size();
639
640	int counter = 0;
641	while(0==0)
642	{
643	if((*this)[counter]==0)
644	{
645	size1--;
646	}
647
648	if((*this)[counter]!=0)
649	break;
650
651	counter++;
652	}
653
654	counter = 0;
655	while(0==0)
656	{
657	if(second[counter]==0)
658	{
659	size2--;
660	}
661
662	if(second[counter]!=0)
663	break;
664
665	counter++;
666	}
667
668	if(size1!=size2)
669	{
670	return false;
671	}
672	else
673	{
674	for(int i=0;i<size1;i++)
675	{
676	if((*this)[size()-1-i]!=second[second.size()-1-i])
677	{
678	return false;
679	}
680	}
681
682	return true;
683	}*/
684	}
685
686	bool operator<(const my_ivec &second) const
687	{
688	return !(((this)>second)\|\|((this)==second));
689	}
690
691	bool operator!=(const my_ivec &second) const
692	{
693	return !((*this)==second);
694	}
695
696	bool operator<=(const my_ivec &second) const
697	{
698	return !((*this)>second);
699	}
700
701	bool operator>=(const my_ivec &second) const
702	{
703	return !((*this)<second);
704	}
705
706	my_ivec right(my_ivec original)
707	{
708
709	}
710	};
711
712
713
714
715
716
717
718	//! Conditional(e) Multicriteria-Laplace-Inverse-Gamma distribution density
719	class emlig // : eEF
720	{
721
722	/// A statistic in a form of a Hasse diagram representing a complex of convex polyhedrons obtained as a result
723	/// of data update from Bayesian estimation or set by the user if this emlig is a prior density
724
725
726	vector<list<polyhedron*>> for_splitting;
727
728	vector<list<polyhedron*>> for_merging;
729
730	list<condition*> conditions;
731
732	double normalization_factor;
733
734
735
736	void alter_toprow_conditions(condition *condition, bool should_be_added)
737	{
738	for(polyhedron* horiz_ref = statistic.rows[statistic.size()-1];horiz_ref!=statistic.get_end();horiz_ref=horiz_ref->next_poly)
739	{
740	set<vertex*>::iterator vertex_ref = horiz_ref->vertices.begin();
741
742	do
743	{
744	vertex_ref++;
745	}
746	while((vertex_ref)->parentconditions.find(condition)==(vertex_ref)->parentconditions.end());
747
748	double product = (vertex_ref)->get_coordinates()condition->value;
749
750	if(should_be_added)
751	{
752	((toprow*) horiz_ref)->condition_order++;
753
754	if(product>0)
755	{
756	((toprow*) horiz_ref)->condition_sum += condition->value;
757	}
758	else
759	{
760	((toprow*) horiz_ref)->condition_sum -= condition->value;
761	}
762	}
763	else
764	{
765	((toprow*) horiz_ref)->condition_order--;
766
767	if(product<0)
768	{
769	((toprow*) horiz_ref)->condition_sum += condition->value;
770	}
771	else
772	{
773	((toprow*) horiz_ref)->condition_sum -= condition->value;
774	}
775	}
776	}
777	}
778
779
780
781	void send_state_message(polyhedron* sender, condition toadd, condition toremove, int level)
782	{
783
784	bool shouldmerge = (toremove != NULL);
785	bool shouldsplit = (toadd != NULL);
786
787	if(shouldsplit\|\|shouldmerge)
788	{
789	for(list<polyhedron*>::iterator parent_iterator = sender->parents.begin();parent_iterator!=sender->parents.end();parent_iterator++)
790	{
791	polyhedron* current_parent = *parent_iterator;
792
793	current_parent->message_counter++;
794
795	bool is_last = (current_parent->message_counter == current_parent->number_of_children());
796	bool is_first = (current_parent->message_counter == 1);
797
798	if(shouldmerge)
799	{
800	int child_state = sender->get_state(MERGE);
801	int parent_state = current_parent->get_state(MERGE);
802
803	if(parent_state == 0\|\|is_first)
804	{
805	parent_state = current_parent->set_state(child_state, MERGE);
806	}
807
808	if(child_state == 0)
809	{
810	if(current_parent->mergechild == NULL)
811	{
812	current_parent->mergechild = sender;
813	}
814	}
815
816	if(is_last)
817	{
818	if(parent_state == 1)
819	{
820	((toprow*)current_parent)->condition_sum-=toremove->value;
821	((toprow*)current_parent)->condition_order--;
822	}
823
824	if(parent_state == -1)
825	{
826	((toprow*)current_parent)->condition_sum+=toremove->value;
827	((toprow*)current_parent)->condition_order--;
828	}
829
830	if(current_parent->mergechild != NULL)
831	{
832	if(current_parent->mergechild->get_multiplicity()==1)
833	{
834	if(parent_state > 0)
835	{
836	current_parent->mergechild->positiveparent = current_parent;
837	}
838
839	if(parent_state < 0)
840	{
841	current_parent->mergechild->negativeparent = current_parent;
842	}
843	}
844	}
845	else
846	{
847	//current_parent->set_state(0,MERGE);
848
849	if(level == number_of_parameters - 1)
850	{
851	toprow* cur_par_toprow = ((toprow*)current_parent);
852	cur_par_toprow->probability = 0.0;
853
854	//set<simplex*> new_triangulation;
855
856	for(set<simplex*>::iterator s_ref = current_parent->triangulation.begin();s_ref!=current_parent->triangulation.end();s_ref++)
857	{
858	double cur_prob = cur_par_toprow->integrate_simplex((*s_ref),'C');
859
860	cur_par_toprow->probability += cur_prob;
861
862	//new_triangulation.insert(pair<double,set<vertex>>(cur_prob,(t_ref).second));
863	}
864
865	cur_par_toprow->my_emlig->normalization_factor += cur_par_toprow->probability;
866
867	//current_parent->triangulation.clear();
868	//current_parent->triangulation.insert(new_triangulation.begin(),new_triangulation.end());
869	}
870	}
871
872	if(parent_state == 0)
873	{
874	for_merging[level+1].push_back(current_parent);
875	//current_parent->parentconditions.erase(toremove);
876	}
877
878
879	}
880	}
881
882	if(shouldsplit)
883	{
884	current_parent->totallyneutralgrandchildren.insert(sender->totallyneutralchildren.begin(),sender->totallyneutralchildren.end());
885
886	for(set<polyhedron*>::iterator tot_child_ref = sender->totallyneutralchildren.begin();tot_child_ref!=sender->totallyneutralchildren.end();tot_child_ref++)
887	{
888	(*tot_child_ref)->grandparents.insert(current_parent);
889	}
890
891	switch(sender->get_state(SPLIT))
892	{
893	case 1:
894	current_parent->positivechildren.push_back(sender);
895	current_parent->positiveneutralvertices.insert(sender->vertices.begin(),sender->vertices.end());
896	break;
897	case 0:
898	current_parent->neutralchildren.push_back(sender);
899	current_parent->positiveneutralvertices.insert(sender->positiveneutralvertices.begin(),sender->positiveneutralvertices.end());
900	current_parent->negativeneutralvertices.insert(sender->negativeneutralvertices.begin(),sender->negativeneutralvertices.end());
901
902	if(current_parent->totally_neutral == NULL)
903	{
904	current_parent->totally_neutral = sender->totally_neutral;
905	}
906	else
907	{
908	current_parent->totally_neutral = current_parent->totally_neutral && sender->totally_neutral;
909	}
910
911	if(sender->totally_neutral)
912	{
913	current_parent->totallyneutralchildren.insert(sender);
914	}
915
916	break;
917	case -1:
918	current_parent->negativechildren.push_back(sender);
919	current_parent->negativeneutralvertices.insert(sender->vertices.begin(),sender->vertices.end());
920	break;
921	}
922
923	if(is_last)
924	{
925
926	/// \TODO Nechapu druhou podminku, zda se mi ze je to spatne.. Nemela by byt jen prvni? Nebo se jedna o nastaveni totalni neutrality?
927	if((current_parent->negativechildren.size()>0&&current_parent->positivechildren.size()>0)\|\|
928	(current_parent->neutralchildren.size()>0&&current_parent->totally_neutral==false))
929	{
930	for_splitting[level+1].push_back(current_parent);
931
932	current_parent->set_state(0, SPLIT);
933	}
934	else
935	{
936	if(current_parent->negativechildren.size()>0)
937	{
938	current_parent->set_state(-1, SPLIT);
939
940	((toprow*)current_parent)->condition_sum-=toadd->value;
941
942	}
943	else if(current_parent->positivechildren.size()>0)
944	{
945	current_parent->set_state(1, SPLIT);
946
947	((toprow*)current_parent)->condition_sum+=toadd->value;
948	}
949	else
950	{
951	current_parent->raise_multiplicity();
952	}
953
954	((toprow*)current_parent)->condition_order++;
955
956	if(level == number_of_parameters - 1)
957	{
958	toprow* cur_par_toprow = ((toprow*)current_parent);
959	cur_par_toprow->probability = 0.0;
960
961	//map<double,set<vertex*>> new_triangulation;
962
963	for(set<simplex*>::iterator s_ref = current_parent->triangulation.begin();s_ref!=current_parent->triangulation.end();s_ref++)
964	{
965	double cur_prob = cur_par_toprow->integrate_simplex((*s_ref),'C');
966
967	cur_par_toprow->probability += cur_prob;
968
969	//new_triangulation.insert(pair<double,set<vertex>>(cur_prob,(t_ref).second));
970	}
971
972	cur_par_toprow->my_emlig->normalization_factor += cur_par_toprow->probability;
973
974	//current_parent->triangulation.clear();
975	//current_parent->triangulation.insert(new_triangulation.begin(),new_triangulation.end());
976	}
977
978	if(current_parent->mergechild == NULL)
979	{
980	current_parent->positivechildren.clear();
981	current_parent->negativechildren.clear();
982	current_parent->neutralchildren.clear();
983	current_parent->totallyneutralchildren.clear();
984	current_parent->totallyneutralgrandchildren.clear();
985	// current_parent->grandparents.clear();
986	current_parent->positiveneutralvertices.clear();
987	current_parent->negativeneutralvertices.clear();
988	current_parent->totally_neutral = NULL;
989	current_parent->kids_rel_addresses.clear();
990	}
991	}
992	}
993	}
994
995	if(is_last)
996	{
997	current_parent->mergechild = NULL;
998	current_parent->message_counter = 0;
999
1000	send_state_message(current_parent,toadd,toremove,level+1);
1001	}
1002
1003	}
1004
1005	}
1006	}
1007
1008	public:
1009	c_statistic statistic;
1010
1011	vertex* minimal_vertex;
1012
1013	double min_ll;
1014
1015	vector<multiset<my_ivec>> correction_factors;
1016
1017	int number_of_parameters;
1018
1019	/// A default constructor creates an emlig with predefined statistic representing only the range of the given
1020	/// parametric space, where the number of parameters of the needed model is given as a parameter to the constructor.
1021	emlig(int number_of_parameters)
1022	{
1023	this->number_of_parameters = number_of_parameters;
1024
1025	create_statistic(number_of_parameters);
1026
1027	min_ll = numeric_limits<double>::max();
1028	}
1029
1030	/// A constructor for creating an emlig when the user wants to create the statistic by himself. The creation of a
1031	/// statistic is needed outside the constructor. Used for a user defined prior distribution on the parameters.
1032	emlig(c_statistic statistic)
1033	{
1034	this->statistic = statistic;
1035
1036	min_ll = numeric_limits<double>::max();
1037	}
1038
1039	void step_me(int marker)
1040	{
1041
1042	for(int i = 0;i<statistic.size();i++)
1043	{
1044	//int zero = 0;
1045	//int one = 0;
1046	//int two = 0;
1047
1048	for(polyhedron* horiz_ref = statistic.rows[i];horiz_ref!=statistic.get_end();horiz_ref=horiz_ref->next_poly)
1049	{
1050
1051
1052	if(i==statistic.size()-1)
1053	{
1054	cout << ((toprow)horiz_ref)->condition_sum << " " << ((toprow)horiz_ref)->probability << endl;
1055	cout << "Order:" << ((toprow*)horiz_ref)->condition_order << endl;
1056	}
1057
1058	/*
1059	if(i==0)
1060	{
1061	cout << ((vertex*)horiz_ref)->get_coordinates() << endl;
1062	}
1063	*/
1064
1065	/*
1066	char* string = "Checkpoint";
1067
1068
1069	if((*horiz_ref).parentconditions.size()==0)
1070	{
1071	zero++;
1072	}
1073	else if((*horiz_ref).parentconditions.size()==1)
1074	{
1075	one++;
1076	}
1077	else
1078	{
1079	two++;
1080	}
1081	*/
1082
1083	}
1084	}
1085
1086
1087	/*
1088	list<vec> table_entries;
1089	for(polyhedron* horiz_ref = statistic.rows[statistic.size()-1];horiz_ref!=statistic.row_ends[statistic.size()-1];horiz_ref=horiz_ref->next_poly)
1090	{
1091	toprow current_toprow = (toprow)(horiz_ref);
1092	for(list<set<vertex*>>::iterator tri_ref = current_toprow->triangulation.begin();tri_ref!=current_toprow->triangulation.end();tri_ref++)
1093	{
1094	for(set<vertex>::iterator vert_ref = (tri_ref).begin();vert_ref!=(*tri_ref).end();vert_ref++)
1095	{
1096	vec table_entry = vec();
1097
1098	table_entry.ins(0,(vert_ref)->get_coordinates()current_toprow->condition.get(1,current_toprow->condition.size()-1)-current_toprow->condition.get(0,0));
1099
1100	table_entry.ins(0,(*vert_ref)->get_coordinates());
1101
1102	table_entries.push_back(table_entry);
1103	}
1104	}
1105	}
1106
1107	unique(table_entries.begin(),table_entries.end());
1108
1109
1110
1111	for(list<vec>::iterator entry_ref = table_entries.begin();entry_ref!=table_entries.end();entry_ref++)
1112	{
1113	ofstream myfile;
1114	myfile.open("robust_data.txt", ios::out \| ios::app);
1115	if (myfile.is_open())
1116	{
1117	for(int i = 0;i<(*entry_ref).size();i++)
1118	{
1119	myfile << (*entry_ref)[i] << ";";
1120	}
1121	myfile << endl;
1122
1123	myfile.close();
1124	}
1125	else
1126	{
1127	cout << "File problem." << endl;
1128	}
1129	}
1130	*/
1131
1132
1133	return;
1134	}
1135
1136	int statistic_rowsize(int row)
1137	{
1138	return statistic.row_size(row);
1139	}
1140
1141	void add_condition(vec toadd)
1142	{
1143	vec null_vector = "";
1144
1145	add_and_remove_condition(toadd, null_vector);
1146	}
1147
1148
1149	void remove_condition(vec toremove)
1150	{
1151	vec null_vector = "";
1152
1153	add_and_remove_condition(null_vector, toremove);
1154
1155	}
1156
1157	void add_and_remove_condition(vec toadd, vec toremove)
1158	{
1159	//step_me(0);
1160	normalization_factor = 0;
1161	min_ll = numeric_limits<double>::max();
1162
1163	bool should_remove = (toremove.size() != 0);
1164	bool should_add = (toadd.size() != 0);
1165
1166	for_splitting.clear();
1167	for_merging.clear();
1168
1169	for(int i = 0;i<statistic.size();i++)
1170	{
1171	list<polyhedron*> empty_split;
1172	list<polyhedron*> empty_merge;
1173
1174	for_splitting.push_back(empty_split);
1175	for_merging.push_back(empty_merge);
1176	}
1177
1178	list<condition*>::iterator toremove_ref = conditions.end();
1179	bool condition_should_be_added = should_add;
1180
1181	for(list<condition*>::iterator ref = conditions.begin();ref!=conditions.end();ref++)
1182	{
1183	if(should_remove)
1184	{
1185	if((*ref)->value == toremove)
1186	{
1187	if((*ref)->multiplicity>1)
1188	{
1189	(*ref)->multiplicity--;
1190
1191	alter_toprow_conditions(*ref,false);
1192
1193	should_remove = false;
1194	}
1195	else
1196	{
1197	toremove_ref = ref;
1198	}
1199	}
1200	}
1201
1202	if(should_add)
1203	{
1204	if((*ref)->value == toadd)
1205	{
1206	(*ref)->multiplicity++;
1207
1208	alter_toprow_conditions(*ref,true);
1209
1210	should_add = false;
1211
1212	condition_should_be_added = false;
1213	}
1214	}
1215	}
1216
1217	condition* condition_to_remove = NULL;
1218
1219	if(toremove_ref!=conditions.end())
1220	{
1221	condition_to_remove = *toremove_ref;
1222	conditions.erase(toremove_ref);
1223	}
1224
1225	condition* condition_to_add = NULL;
1226
1227	if(condition_should_be_added)
1228	{
1229	condition* new_condition = new condition(toadd);
1230
1231	conditions.push_back(new_condition);
1232	condition_to_add = new_condition;
1233	}
1234
1235	for(polyhedron* horizontal_position = statistic.rows[0];horizontal_position!=statistic.get_end();horizontal_position=horizontal_position->next_poly)
1236	{
1237	vertex* current_vertex = (vertex*)horizontal_position;
1238
1239	if(should_add\|\|should_remove)
1240	{
1241	vec appended_coords = current_vertex->get_coordinates();
1242	appended_coords.ins(0,-1.0);
1243
1244	if(should_add)
1245	{
1246	double local_condition = 0;// = toadd*(appended_coords.first/=appended_coords.second);
1247
1248	local_condition = appended_coords*toadd;
1249
1250	current_vertex->set_state(local_condition,SPLIT);
1251
1252	/// \TODO There should be a rounding error tolerance used here to insure we are not having too many points because of rounding error.
1253	if(local_condition == 0)
1254	{
1255	current_vertex->totally_neutral = true;
1256
1257	current_vertex->raise_multiplicity();
1258
1259	current_vertex->negativeneutralvertices.insert(current_vertex);
1260	current_vertex->positiveneutralvertices.insert(current_vertex);
1261	}
1262	}
1263
1264	if(should_remove)
1265	{
1266	set<condition*>::iterator cond_ref;
1267
1268	for(cond_ref = current_vertex->parentconditions.begin();cond_ref!=current_vertex->parentconditions.end();cond_ref++)
1269	{
1270	if(*cond_ref == condition_to_remove)
1271	{
1272	break;
1273	}
1274	}
1275
1276	if(cond_ref!=current_vertex->parentconditions.end())
1277	{
1278	current_vertex->parentconditions.erase(cond_ref);
1279	current_vertex->set_state(0,MERGE);
1280	for_merging[0].push_back(current_vertex);
1281	}
1282	else
1283	{
1284	double local_condition = toremove*appended_coords;
1285	current_vertex->set_state(local_condition,MERGE);
1286	}
1287	}
1288	}
1289
1290	send_state_message(current_vertex, condition_to_add, condition_to_remove, 0);
1291
1292	}
1293
1294
1295
1296	if(should_remove)
1297	{
1298	for(int i = 0;i<for_merging.size();i++)
1299	{
1300	for(list<polyhedron*>::iterator merge_ref = for_merging[i].begin();merge_ref!=for_merging[i].end();merge_ref++)
1301	{
1302	cout << (*merge_ref)->get_state(MERGE) << ",";
1303	}
1304
1305	cout << endl;
1306	}
1307
1308	set<vertex*> vertices_to_be_reduced;
1309
1310	int k = 1;
1311
1312	for(vector<list<polyhedron*>>::iterator vert_ref = for_merging.begin();vert_ref<for_merging.end();vert_ref++)
1313	{
1314	for(list<polyhedron*>::reverse_iterator merge_ref = vert_ref->rbegin();merge_ref!=vert_ref->rend();merge_ref++)
1315	{
1316	if((*merge_ref)->get_multiplicity()>1)
1317	{
1318	if(k==1)
1319	{
1320	vertices_to_be_reduced.insert((vertex)(merge_ref));
1321	}
1322	else
1323	{
1324	(*merge_ref)->lower_multiplicity();
1325	}
1326	}
1327	else
1328	{
1329	toprow* current_positive = (toprow)(merge_ref)->positiveparent;
1330	toprow* current_negative = (toprow)(merge_ref)->negativeparent;
1331
1332	//current_positive->condition_sum -= toremove;
1333	//current_positive->condition_order--;
1334
1335	current_positive->parentconditions.erase(condition_to_remove);
1336
1337	current_positive->children.insert(current_positive->children.end(),current_negative->children.begin(),current_negative->children.end());
1338	current_positive->children.remove(*merge_ref);
1339
1340	for(list<polyhedron*>::iterator child_ref = current_negative->children.begin();child_ref!=current_negative->children.end();child_ref++)
1341	{
1342	(*child_ref)->parents.remove(current_negative);
1343	(*child_ref)->parents.push_back(current_positive);
1344	}
1345
1346	// current_positive->parents.insert(current_positive->parents.begin(),current_negative->parents.begin(),current_negative->parents.end());
1347	// unique(current_positive->parents.begin(),current_positive->parents.end());
1348
1349	for(list<polyhedron*>::iterator parent_ref = current_negative->parents.begin();parent_ref!=current_negative->parents.end();parent_ref++)
1350	{
1351	(*parent_ref)->children.remove(current_negative);
1352
1353	switch(current_negative->get_state(SPLIT))
1354	{
1355	case -1:
1356	(*parent_ref)->negativechildren.remove(current_negative);
1357	break;
1358	case 0:
1359	(*parent_ref)->neutralchildren.remove(current_negative);
1360	break;
1361	case 1:
1362	(*parent_ref)->positivechildren.remove(current_negative);
1363	break;
1364	}
1365	//(*parent_ref)->children.push_back(current_positive);
1366	}
1367
1368	if(current_positive->get_state(SPLIT)!=0&&current_negative->get_state(SPLIT)==0)
1369	{
1370	for(list<polyhedron*>::iterator parent_ref = current_positive->parents.begin();parent_ref!=current_positive->parents.end();parent_ref++)
1371	{
1372	if(current_positive->get_state(SPLIT)==1)
1373	{
1374	(*parent_ref)->positivechildren.remove(current_positive);
1375	}
1376	else
1377	{
1378	(*parent_ref)->negativechildren.remove(current_positive);
1379	}
1380
1381	(*parent_ref)->neutralchildren.push_back(current_positive);
1382	}
1383
1384	current_positive->set_state(0,SPLIT);
1385	for_splitting[k].push_back(current_positive);
1386	}
1387
1388	if((current_positive->get_state(SPLIT)==0&&!current_positive->totally_neutral)\|\|(current_negative->get_state(SPLIT)==0&&!current_negative->totally_neutral))
1389	{
1390	current_positive->negativechildren.insert(current_positive->negativechildren.end(),current_negative->negativechildren.begin(),current_negative->negativechildren.end());
1391
1392	current_positive->positivechildren.insert(current_positive->positivechildren.end(),current_negative->positivechildren.begin(),current_negative->positivechildren.end());
1393
1394	current_positive->neutralchildren.insert(current_positive->neutralchildren.end(),current_negative->neutralchildren.begin(),current_negative->neutralchildren.end());
1395
1396	switch((*merge_ref)->get_state(SPLIT))
1397	{
1398	case -1:
1399	current_positive->negativechildren.remove(*merge_ref);
1400	break;
1401	case 0:
1402	current_positive->neutralchildren.remove(*merge_ref);
1403	break;
1404	case 1:
1405	current_positive->positivechildren.remove(*merge_ref);
1406	break;
1407	}
1408
1409	current_positive->totallyneutralchildren.insert(current_negative->totallyneutralchildren.begin(),current_negative->totallyneutralchildren.end());
1410
1411	current_positive->totallyneutralchildren.erase(*merge_ref);
1412
1413	current_positive->totallyneutralgrandchildren.insert(current_negative->totallyneutralgrandchildren.begin(),current_negative->totallyneutralgrandchildren.end());
1414
1415	current_positive->negativeneutralvertices.insert(current_negative->negativeneutralvertices.begin(),current_negative->negativeneutralvertices.end());
1416	current_positive->positiveneutralvertices.insert(current_negative->positiveneutralvertices.begin(),current_negative->positiveneutralvertices.end());
1417	}
1418	else
1419	{
1420	if(!current_positive->totally_neutral)
1421	{
1422	current_positive->positivechildren.clear();
1423	current_positive->negativechildren.clear();
1424	current_positive->neutralchildren.clear();
1425	current_positive->totallyneutralchildren.clear();
1426	current_positive->totallyneutralgrandchildren.clear();
1427	current_positive->positiveneutralvertices.clear();
1428	current_positive->negativeneutralvertices.clear();
1429	current_positive->totally_neutral = NULL;
1430	current_positive->kids_rel_addresses.clear();
1431	}
1432
1433	}
1434
1435
1436
1437	current_positive->vertices.insert(current_negative->vertices.begin(),current_negative->vertices.end());
1438
1439
1440	for(set<vertex>::iterator vert_ref = (merge_ref)->vertices.begin();vert_ref!=(*merge_ref)->vertices.end();vert_ref++)
1441	{
1442	if((*vert_ref)->get_multiplicity()==1)
1443	{
1444	current_positive->vertices.erase(*vert_ref);
1445
1446	if((current_positive->get_state(SPLIT)==0&&!current_positive->totally_neutral)\|\|(current_negative->get_state(SPLIT)==0&&!current_negative->totally_neutral))
1447	{
1448	current_positive->negativeneutralvertices.erase(*vert_ref);
1449	current_positive->positiveneutralvertices.erase(*vert_ref);
1450	}
1451	}
1452	}
1453
1454	if(current_negative->get_state(SPLIT)==0&&!current_negative->totally_neutral)
1455	{
1456	for_splitting[k].remove(current_negative);
1457	}
1458
1459	if(current_positive->totally_neutral)
1460	{
1461	if(!current_negative->totally_neutral)
1462	{
1463	for(set<polyhedron*>::iterator grand_ref = current_positive->grandparents.begin();grand_ref!=current_positive->grandparents.end();grand_ref++)
1464	{
1465	(*grand_ref)->totallyneutralgrandchildren.erase(current_positive);
1466	}
1467	}
1468	else
1469	{
1470	for(set<polyhedron*>::iterator grand_ref = current_negative->grandparents.begin();grand_ref!=current_negative->grandparents.end();grand_ref++)
1471	{
1472	(*grand_ref)->totallyneutralgrandchildren.erase(current_negative);
1473	(*grand_ref)->totallyneutralgrandchildren.insert(current_positive);
1474	}
1475	}
1476	}
1477	else
1478	{
1479	if(current_negative->totally_neutral)
1480	{
1481	for(set<polyhedron*>::iterator grand_ref = current_negative->grandparents.begin();grand_ref!=current_negative->grandparents.end();grand_ref++)
1482	{
1483	(*grand_ref)->totallyneutralgrandchildren.erase(current_negative);
1484	}
1485	}
1486	}
1487
1488	current_positive->grandparents.clear();
1489
1490
1491
1492	current_positive->totally_neutral = (current_positive->totally_neutral && current_negative->totally_neutral);
1493
1494	current_positive->my_emlig->normalization_factor += current_positive->triangulate(k==for_splitting.size()-1);
1495
1496	statistic.delete_polyhedron(k,current_negative);
1497
1498	delete current_negative;
1499
1500	for(list<polyhedron>::iterator child_ref = (merge_ref)->children.begin();child_ref!=(*merge_ref)->children.end();child_ref++)
1501	{
1502	(child_ref)->parents.remove(merge_ref);
1503	}
1504
1505	/*
1506	for(list<polyhedron>::iterator parent_ref = (merge_ref)->parents.begin();parent_ref!=(*merge_ref)->parents.end();parent_ref++)
1507	{
1508	(parent_ref)->positivechildren.remove(merge_ref);
1509	(parent_ref)->negativechildren.remove(merge_ref);
1510	(parent_ref)->neutralchildren.remove(merge_ref);
1511	(parent_ref)->children.remove(merge_ref);
1512	}
1513	*/
1514
1515	for(set<polyhedron>::iterator grand_ch_ref = (merge_ref)->totallyneutralgrandchildren.begin();grand_ch_ref!=(*merge_ref)->totallyneutralgrandchildren.end();grand_ch_ref++)
1516	{
1517	(grand_ch_ref)->grandparents.erase(merge_ref);
1518	}
1519
1520
1521	for(set<polyhedron>::iterator grand_p_ref = (merge_ref)->grandparents.begin();grand_p_ref!=(*merge_ref)->grandparents.end();grand_p_ref++)
1522	{
1523	(grand_p_ref)->totallyneutralgrandchildren.erase(merge_ref);
1524	}
1525
1526	for_splitting[k-1].remove(*merge_ref);
1527
1528	statistic.delete_polyhedron(k-1,*merge_ref);
1529
1530	if(k==1)
1531	{
1532	vertices_to_be_reduced.insert((vertex)(merge_ref));
1533	}
1534	else
1535	{
1536	delete *merge_ref;
1537	}
1538	}
1539	}
1540
1541	k++;
1542
1543	}
1544
1545	for(set<vertex*>::iterator vert_ref = vertices_to_be_reduced.begin();vert_ref!=vertices_to_be_reduced.end();vert_ref++)
1546	{
1547	if((*vert_ref)->get_multiplicity()>1)
1548	{
1549	(*vert_ref)->lower_multiplicity();
1550	}
1551	else
1552	{
1553	delete *vert_ref;
1554	}
1555	}
1556
1557	delete condition_to_remove;
1558	}
1559
1560	vector<int> sizevector;
1561	for(int s = 0;s<statistic.size();s++)
1562	{
1563	sizevector.push_back(statistic.row_size(s));
1564	cout << statistic.row_size(s) << ", ";
1565	}
1566
1567	cout << endl;
1568
1569	if(should_add)
1570	{
1571	int k = 1;
1572
1573	vector<list<polyhedron*>>::iterator beginning_ref = ++for_splitting.begin();
1574
1575	for(vector<list<polyhedron*>>::iterator vert_ref = beginning_ref;vert_ref<for_splitting.end();vert_ref++)
1576	{
1577
1578	for(list<polyhedron*>::reverse_iterator split_ref = vert_ref->rbegin();split_ref != vert_ref->rend();split_ref++)
1579	{
1580	polyhedron* new_totally_neutral_child;
1581
1582	polyhedron* current_polyhedron = (*split_ref);
1583
1584	if(vert_ref == beginning_ref)
1585	{
1586	vec coordinates1 = ((vertex)((current_polyhedron->children.begin())))->get_coordinates();
1587	vec coordinates2 = ((vertex)((++current_polyhedron->children.begin())))->get_coordinates();
1588
1589	vec extended_coord2 = coordinates2;
1590	extended_coord2.ins(0,-1.0);
1591
1592	double t = (-toaddextended_coord2)/(toadd(1,toadd.size()-1)(coordinates1-coordinates2));
1593
1594	vec new_coordinates = (1-t)coordinates2+tcoordinates1;
1595
1596	// cout << "c1:" << coordinates1 << endl << "c2:" << coordinates2 << endl << "nc:" << new_coordinates << endl;
1597
1598	vertex* neutral_vertex = new vertex(new_coordinates);
1599
1600	new_totally_neutral_child = neutral_vertex;
1601	}
1602	else
1603	{
1604	toprow* neutral_toprow = new toprow();
1605
1606	neutral_toprow->condition_sum = ((toprow*)current_polyhedron)->condition_sum; // tohle tu bylo driv: zeros(number_of_parameters+1);
1607	neutral_toprow->condition_order = ((toprow*)current_polyhedron)->condition_order+1;
1608
1609	new_totally_neutral_child = neutral_toprow;
1610	}
1611
1612	new_totally_neutral_child->parentconditions.insert(current_polyhedron->parentconditions.begin(),current_polyhedron->parentconditions.end());
1613	new_totally_neutral_child->parentconditions.insert(condition_to_add);
1614
1615	new_totally_neutral_child->my_emlig = this;
1616
1617	new_totally_neutral_child->children.insert(new_totally_neutral_child->children.end(),
1618	current_polyhedron->totallyneutralgrandchildren.begin(),
1619	current_polyhedron->totallyneutralgrandchildren.end());
1620
1621
1622
1623	// cout << ((toprow*)current_polyhedron)->condition << endl << toadd << endl;
1624
1625	toprow* positive_poly = new toprow(((toprow)current_polyhedron)->condition_sum+toadd, ((toprow)current_polyhedron)->condition_order+1);
1626	toprow* negative_poly = new toprow(((toprow)current_polyhedron)->condition_sum-toadd, ((toprow)current_polyhedron)->condition_order+1);
1627
1628	positive_poly->my_emlig = this;
1629	negative_poly->my_emlig = this;
1630
1631	positive_poly->parentconditions.insert(current_polyhedron->parentconditions.begin(),current_polyhedron->parentconditions.end());
1632	negative_poly->parentconditions.insert(current_polyhedron->parentconditions.begin(),current_polyhedron->parentconditions.end());
1633
1634	for(set<polyhedron*>::iterator grand_ref = current_polyhedron->totallyneutralgrandchildren.begin(); grand_ref != current_polyhedron->totallyneutralgrandchildren.end();grand_ref++)
1635	{
1636	(*grand_ref)->parents.push_back(new_totally_neutral_child);
1637
1638	// tohle tu nebylo. ma to tu byt?
1639	//positive_poly->totallyneutralgrandchildren.insert(*grand_ref);
1640	//negative_poly->totallyneutralgrandchildren.insert(*grand_ref);
1641
1642	//(*grand_ref)->grandparents.insert(positive_poly);
1643	//(*grand_ref)->grandparents.insert(negative_poly);
1644
1645	new_totally_neutral_child->vertices.insert((grand_ref)->vertices.begin(),(grand_ref)->vertices.end());
1646	}
1647
1648	positive_poly->children.push_back(new_totally_neutral_child);
1649	negative_poly->children.push_back(new_totally_neutral_child);
1650
1651
1652	for(list<polyhedron*>::iterator parent_ref = current_polyhedron->parents.begin();parent_ref!=current_polyhedron->parents.end();parent_ref++)
1653	{
1654	(*parent_ref)->totallyneutralgrandchildren.insert(new_totally_neutral_child);
1655	// new_totally_neutral_child->grandparents.insert(*parent_ref);
1656
1657	(*parent_ref)->neutralchildren.remove(current_polyhedron);
1658	(*parent_ref)->children.remove(current_polyhedron);
1659
1660	(*parent_ref)->children.push_back(positive_poly);
1661	(*parent_ref)->children.push_back(negative_poly);
1662	(*parent_ref)->positivechildren.push_back(positive_poly);
1663	(*parent_ref)->negativechildren.push_back(negative_poly);
1664	}
1665
1666	positive_poly->parents.insert(positive_poly->parents.end(),
1667	current_polyhedron->parents.begin(),
1668	current_polyhedron->parents.end());
1669
1670	negative_poly->parents.insert(negative_poly->parents.end(),
1671	current_polyhedron->parents.begin(),
1672	current_polyhedron->parents.end());
1673
1674
1675
1676	new_totally_neutral_child->parents.push_back(positive_poly);
1677	new_totally_neutral_child->parents.push_back(negative_poly);
1678
1679	for(list<polyhedron*>::iterator child_ref = current_polyhedron->positivechildren.begin();child_ref!=current_polyhedron->positivechildren.end();child_ref++)
1680	{
1681	(*child_ref)->parents.remove(current_polyhedron);
1682	(*child_ref)->parents.push_back(positive_poly);
1683	}
1684
1685	positive_poly->children.insert(positive_poly->children.end(),
1686	current_polyhedron->positivechildren.begin(),
1687	current_polyhedron->positivechildren.end());
1688
1689	for(list<polyhedron*>::iterator child_ref = current_polyhedron->negativechildren.begin();child_ref!=current_polyhedron->negativechildren.end();child_ref++)
1690	{
1691	(*child_ref)->parents.remove(current_polyhedron);
1692	(*child_ref)->parents.push_back(negative_poly);
1693	}
1694
1695	negative_poly->children.insert(negative_poly->children.end(),
1696	current_polyhedron->negativechildren.begin(),
1697	current_polyhedron->negativechildren.end());
1698
1699	positive_poly->vertices.insert(current_polyhedron->positiveneutralvertices.begin(),current_polyhedron->positiveneutralvertices.end());
1700	positive_poly->vertices.insert(new_totally_neutral_child->vertices.begin(),new_totally_neutral_child->vertices.end());
1701
1702	negative_poly->vertices.insert(current_polyhedron->negativeneutralvertices.begin(),current_polyhedron->negativeneutralvertices.end());
1703	negative_poly->vertices.insert(new_totally_neutral_child->vertices.begin(),new_totally_neutral_child->vertices.end());
1704
1705	new_totally_neutral_child->triangulate(false);
1706
1707	positive_poly->my_emlig->normalization_factor += positive_poly->triangulate(k==for_splitting.size()-1);
1708	negative_poly->my_emlig->normalization_factor += negative_poly->triangulate(k==for_splitting.size()-1);
1709
1710	statistic.append_polyhedron(k-1, new_totally_neutral_child);
1711
1712	statistic.insert_polyhedron(k, positive_poly, current_polyhedron);
1713	statistic.insert_polyhedron(k, negative_poly, current_polyhedron);
1714
1715	statistic.delete_polyhedron(k, current_polyhedron);
1716
1717	delete current_polyhedron;
1718	}
1719
1720	k++;
1721	}
1722	}
1723
1724
1725	sizevector.clear();
1726	for(int s = 0;s<statistic.size();s++)
1727	{
1728	sizevector.push_back(statistic.row_size(s));
1729	cout << statistic.row_size(s) << ", ";
1730	}
1731
1732	cout << endl;
1733
1734	/*
1735	for(polyhedron* topr_ref = statistic.rows[statistic.size()-1];topr_ref!=statistic.row_ends[statistic.size()-1]->next_poly;topr_ref=topr_ref->next_poly)
1736	{
1737	cout << ((toprow*)topr_ref)->condition << endl;
1738	}
1739	*/
1740
1741	// step_me(0);
1742
1743	}
1744
1745	void set_correction_factors(int order)
1746	{
1747	for(int remaining_order = correction_factors.size();remaining_order<order;remaining_order++)
1748	{
1749	multiset<my_ivec> factor_templates;
1750	multiset<my_ivec> final_factors;
1751
1752	my_ivec orig_template = my_ivec();
1753
1754	for(int i = 1;i<number_of_parameters-remaining_order+1;i++)
1755	{
1756	bool in_cycle = false;
1757	for(int j = 0;j<=remaining_order;j++) {
1758
1759	multiset<my_ivec>::iterator fac_ref = factor_templates.begin();
1760
1761	do
1762	{
1763	my_ivec current_template;
1764	if(!in_cycle)
1765	{
1766	current_template = orig_template;
1767	in_cycle = true;
1768	}
1769	else
1770	{
1771	current_template = (*fac_ref);
1772	fac_ref++;
1773	}
1774
1775	current_template.ins(current_template.size(),i);
1776
1777	// cout << "template:" << current_template << endl;
1778
1779	if(current_template.size()==remaining_order+1)
1780	{
1781	final_factors.insert(current_template);
1782	}
1783	else
1784	{
1785	factor_templates.insert(current_template);
1786	}
1787	}
1788	while(fac_ref!=factor_templates.end());
1789	}
1790	}
1791
1792	correction_factors.push_back(final_factors);
1793
1794	}
1795	}
1796
1797
1798
1799	mat sample_mat(int n)
1800	{
1801
1802	/// \TODO tady je to spatne, tady nesmi byt conditions.size(), viz RARX.bayes()
1803	if(conditions.size()-2-number_of_parameters>=0)
1804	{
1805	mat sample_mat;
1806	map<double,toprow*> ordered_toprows;
1807	double sum_a = 0;
1808
1809	//cout << "Likelihoods of toprows:" << endl;
1810
1811	for(polyhedron* top_ref = statistic.rows[number_of_parameters];top_ref!=statistic.end_poly;top_ref=top_ref->next_poly)
1812	{
1813	toprow* current_top = (toprow*)top_ref;
1814
1815	sum_a+=current_top->probability;
1816	/*
1817	cout << current_top->probability << " ";
1818
1819	for(set<vertex>::iterator vert_ref = (top_ref).vertices.begin();vert_ref!=(*top_ref).vertices.end();vert_ref++)
1820	{
1821	cout << round(100(vert_ref)->get_coordinates())/100 << " ; ";
1822	}
1823	*/
1824
1825	// cout << endl;
1826	ordered_toprows.insert(pair<double,toprow*>(sum_a,current_top));
1827	}
1828
1829	// cout << "Sum N: " << normalization_factor << endl;
1830
1831	while(sample_mat.cols()<n)
1832	{
1833	//// cout << "*************************************" << endl;
1834
1835
1836
1837	double rnumber = randu()*sum_a;
1838
1839	// cout << "RND:" << rnumber << endl;
1840
1841	// This could be more efficient (log n), but map::upper_bound() doesn't let me dereference returned iterator
1842	int toprow_count = 0;
1843	toprow* sampled_toprow;
1844	for(map<double,toprow*>::iterator top_ref = ordered_toprows.begin();top_ref!=ordered_toprows.end();top_ref++)
1845	{
1846	// cout << "CDF:"<< (*top_ref).first << endl;
1847	toprow_count++;
1848
1849	if((*top_ref).first >= rnumber)
1850	{
1851	sampled_toprow = (*top_ref).second;
1852	break;
1853	}
1854	}
1855
1856	//// cout << "Toprow/Count: " << toprow_count << "/" << ordered_toprows.size() << endl;
1857	// cout << &sampled_toprow << ";";
1858
1859	rnumber = randu();
1860
1861	set<simplex*>::iterator s_ref;
1862	double sum_b = 0;
1863	int simplex_count = 0;
1864	for(s_ref = sampled_toprow->triangulation.begin();s_ref!=sampled_toprow->triangulation.end();s_ref++)
1865	{
1866	simplex_count++;
1867
1868	sum_b += (*s_ref)->probability;
1869
1870	if(sum_b/sampled_toprow->probability >= rnumber)
1871	break;
1872	}
1873
1874	//// cout << "Simplex/Count: " << simplex_count << "/" << sampled_toprow->triangulation.size() << endl;
1875	//// cout << "Simplex factor: " << (*s_ref)->probability << endl;
1876	//// cout << "Toprow factor: " << sampled_toprow->probability << endl;
1877	//// cout << "Emlig factor: " << normalization_factor << endl;
1878	// cout << &(*tri_ref) << endl;
1879
1880	int number_of_runs = 0;
1881	bool have_sigma = false;
1882	double sigma = 0;
1883	do
1884	{
1885	rnumber = randu();
1886
1887	double sum_g = 0;
1888	for(int i = 0;i<(*s_ref)->positive_gamma_parameters.size();i++)
1889	{
1890	for(multimap<double,double>::iterator g_ref = (s_ref)->positive_gamma_parameters[i].begin();g_ref != (s_ref)->positive_gamma_parameters[i].end();g_ref++)
1891	{
1892	sum_g += (g_ref).first/(s_ref)->positive_gamma_sum;
1893
1894
1895	if(sum_g>rnumber)
1896	{
1897	//itpp::Gamma_RNG* gamma = new itpp::Gamma_RNG(conditions.size()-number_of_parameters,1/(*g_ref).second);
1898	//sigma = 1/(*gamma)();
1899
1900	GamRNG.setup(conditions.size()-number_of_parameters,(*g_ref).second);
1901
1902	sigma = 1/GamRNG();
1903
1904	// cout << "Sigma mean: " << (*g_ref).second/(conditions.size()-number_of_parameters-1) << endl;
1905	break;
1906	}
1907	}
1908
1909	if(sigma!=0)
1910	{
1911	break;
1912	}
1913	}
1914
1915	rnumber = randu();
1916
1917	double pg_sum = 0;
1918	for(vector<multimap<double,double>>::iterator v_ref = (s_ref)->positive_gamma_parameters.begin();v_ref!=(s_ref)->positive_gamma_parameters.end();v_ref++)
1919	{
1920	for(multimap<double,double>::iterator pg_ref = (v_ref).begin();pg_ref!=(v_ref).end();pg_ref++)
1921	{
1922	pg_sum += exp(((s_ref)->min_beta-(pg_ref).second)/sigma)pow((pg_ref).second/sigma,(int)conditions.size()-number_of_parameters-1)(pg_ref).second/fact(conditions.size()-number_of_parameters-1)(pg_ref).first;
1923	}
1924	}
1925
1926	double ng_sum = 0;
1927	for(vector<multimap<double,double>>::iterator v_ref = (s_ref)->negative_gamma_parameters.begin();v_ref!=(s_ref)->negative_gamma_parameters.end();v_ref++)
1928	{
1929	for(multimap<double,double>::iterator ng_ref = (v_ref).begin();ng_ref!=(v_ref).end();ng_ref++)
1930	{
1931	ng_sum += exp(((s_ref)->min_beta-(ng_ref).second)/sigma)pow((ng_ref).second/sigma,(int)conditions.size()-number_of_parameters-1)(ng_ref).second/fact(conditions.size()-number_of_parameters-1)(ng_ref).first;
1932	}
1933	}
1934
1935	if((pg_sum-ng_sum)/pg_sum>rnumber)
1936	{
1937	have_sigma = true;
1938	}
1939
1940	number_of_runs++;
1941	}
1942	while(!have_sigma);
1943
1944	//// cout << "Sigma: " << sigma << endl;
1945	//// cout << "Nr. of runs: " << number_of_runs << endl;
1946
1947	int dimension = (*s_ref)->vertices.size()-1;
1948
1949	mat jacobian(dimension,dimension);
1950	vec gradient = sampled_toprow->condition_sum.right(dimension);
1951
1952	vertex* base_vert = (s_ref)->vertices.begin();
1953
1954	//// cout << "Base vertex coords(should be close to est. param.): " << base_vert->get_coordinates() << endl;
1955
1956	int row_count = 0;
1957
1958	for(set<vertex>::iterator vert_ref = ++(s_ref)->vertices.begin();vert_ref!=(*s_ref)->vertices.end();vert_ref++)
1959	{
1960	vec current_coords = (*vert_ref)->get_coordinates();
1961
1962	//// cout << "Coords of vertex[" << row_count << "]: " << current_coords << endl;
1963
1964	vec relative_coords = current_coords-base_vert->get_coordinates();
1965
1966	jacobian.set_row(row_count,relative_coords);
1967
1968	row_count++;
1969	}
1970
1971	//// cout << "Jacobian: " << jacobian << endl;
1972
1973	//// cout << "Gradient before trafo:" << gradient << endl;
1974
1975	gradient = jacobian*gradient;
1976
1977	//// cout << "Gradient after trafo:" << gradient << endl;
1978
1979	// vec normal_gradient = gradient/sqrt(gradient*gradient);
1980	// cout << gradient << endl;
1981	// cout << normal_gradient << endl;
1982	// cout << sqrt(gradient*gradient) << endl;
1983
1984	mat rotation_matrix = eye(dimension);
1985
1986
1987
1988	for(int i = 1;i<dimension;i++)
1989	{
1990	vec x_axis = zeros(dimension);
1991	x_axis.set(0,1);
1992
1993	x_axis = rotation_matrix*x_axis;
1994
1995	double t = abs(gradient[i]/gradient*x_axis);
1996
1997	double sin_theta = sign(gradient[i])*t/sqrt(1+pow(t,2));
1998	double cos_theta = sign(gradient*x_axis)/sqrt(1+pow(t,2));
1999
2000	mat partial_rotation = eye(dimension);
2001
2002	partial_rotation.set(0,0,cos_theta);
2003	partial_rotation.set(i,i,cos_theta);
2004
2005	partial_rotation.set(0,i,sin_theta);
2006	partial_rotation.set(i,0,-sin_theta);
2007
2008	rotation_matrix = rotation_matrix*partial_rotation;
2009
2010	}
2011
2012	// cout << rotation_matrix << endl;
2013
2014	mat extended_rotation = rotation_matrix;
2015	extended_rotation.ins_col(0,zeros(extended_rotation.rows()));
2016
2017	//// cout << "Extended rotation: " << extended_rotation << endl;
2018
2019	vec minima = itpp::min(extended_rotation,2);
2020	vec maxima = itpp::max(extended_rotation,2);
2021
2022	//// cout << "Minima: " << minima << endl;
2023	//// cout << "Maxima: " << maxima << endl;
2024
2025	vec sample_coordinates;
2026	bool is_inside = true;
2027
2028	vec new_sample;
2029	sample_coordinates = new_sample;
2030
2031	for(int j = 0;j<number_of_parameters;j++)
2032	{
2033	rnumber = randu();
2034
2035	double coordinate;
2036
2037	if(j==0)
2038	{
2039	vec new_gradient = rotation_matrix*gradient;
2040
2041	//// cout << "New gradient(should have only first component nonzero):" << new_gradient << endl;
2042
2043	// cout << "Max: " << maxima[0] << " Min: " << minima[0] << " Grad:" << new_gradient[0] << endl;
2044
2045	double log_bracket = 1-rnumber(1-exp(new_gradient[0]/sigma(minima[0]-maxima[0])));
2046
2047	coordinate = minima[0]-sigma/new_gradient[0]*log(log_bracket);
2048	}
2049	else
2050	{
2051	coordinate = minima[j]+rnumber*(maxima[j]-minima[j]);
2052	}
2053
2054	sample_coordinates.ins(j,coordinate);
2055	}
2056
2057	//// cout << "Sampled coordinates(gradient direction): " << sample_coordinates << endl;
2058
2059	sample_coordinates = rotation_matrix.T()*sample_coordinates;
2060
2061	//// cout << "Sampled coordinates(backrotated direction):" << sample_coordinates << endl;
2062
2063
2064	for(int j = 0;j<sample_coordinates.size();j++)
2065	{
2066	if(sample_coordinates[j]<0)
2067	{
2068	is_inside = false;
2069	}
2070	}
2071
2072	double above_criterion = ones(sample_coordinates.size())*sample_coordinates;
2073
2074	if(above_criterion>1)
2075	{
2076	is_inside = false;
2077	}
2078
2079	if(is_inside)
2080	{
2081	sample_coordinates = jacobian.T()sample_coordinates+(base_vert).get_coordinates();
2082
2083	sample_coordinates.ins(0,sigma);
2084
2085	//// cout << "Sampled coordinates(parameter space):" << sample_coordinates << endl;
2086
2087	sample_mat.ins_col(0,sample_coordinates);
2088
2089	cout << sample_mat.cols() << ",";
2090	}
2091
2092	// cout << sampled_toprow->condition_sum.right(sampled_toprow->condition_sum.size()-1)*min_grad->get_coordinates()-sampled_toprow->condition_sum[0] << endl;
2093	// cout << sampled_toprow->condition_sum.right(sampled_toprow->condition_sum.size()-1)*max_grad->get_coordinates()-sampled_toprow->condition_sum[0] << endl;
2094
2095
2096	}
2097
2098	cout << endl;
2099	return sample_mat;
2100	}
2101	else
2102	{
2103	throw new exception("You are trying to sample from density that is not determined (parameters can't be integrated out)!");
2104
2105	return 0;
2106	}
2107
2108
2109	}
2110
2111	protected:
2112
2113	/// A method for creating plain default statistic representing only the range of the parameter space.
2114	void create_statistic(int number_of_parameters)
2115	{
2116	/*
2117	for(int i = 0;i<number_of_parameters;i++)
2118	{
2119	vec condition_vec = zeros(number_of_parameters+1);
2120	condition_vec[i+1] = 1;
2121
2122	condition* new_condition = new condition(condition_vec);
2123
2124	conditions.push_back(new_condition);
2125	}
2126	*/
2127
2128	// An empty vector of coordinates.
2129	vec origin_coord;
2130
2131	// We create an origin - this point will have all the coordinates zero, but now it has an empty vector of coords.
2132	vertex *origin = new vertex(origin_coord);
2133
2134	origin->my_emlig = this;
2135
2136	/*
2137	// As a statistic, we have to create a vector of vectors of polyhedron pointers. It will then represent the Hasse
2138	// diagram. First we create a vector of polyhedrons..
2139	list<polyhedron*> origin_vec;
2140
2141	// ..we fill it with the origin..
2142	origin_vec.push_back(origin);
2143
2144	// ..and we fill the statistic with the created vector.
2145	statistic.push_back(origin_vec);
2146	*/
2147
2148	statistic = *(new c_statistic());
2149
2150	statistic.append_polyhedron(0, origin);
2151
2152	// Now we have a statistic for a zero dimensional space. Regarding to how many dimensional space we need to
2153	// describe, we have to widen the descriptional default statistic. We use an iterative procedure as follows:
2154	for(int i=0;i<number_of_parameters;i++)
2155	{
2156	// We first will create two new vertices. These will be the borders of the parameter space in the dimension
2157	// of newly added parameter. Therefore they will have all coordinates except the last one zero. We get the
2158	// right amount of zero cooridnates by reading them from the origin
2159	vec origin_coord = origin->get_coordinates();
2160
2161	// And we incorporate the nonzero coordinates into the new cooordinate vectors
2162	vec origin_coord1 = concat(origin_coord,-max_range);
2163	vec origin_coord2 = concat(origin_coord,max_range);
2164
2165
2166	// Now we create the points
2167	vertex* new_point1 = new vertex(origin_coord1);
2168	vertex* new_point2 = new vertex(origin_coord2);
2169
2170	new_point1->my_emlig = this;
2171	new_point2->my_emlig = this;
2172
2173	//*********************************************************************************************************
2174	// The algorithm for recursive build of a new Hasse diagram representing the space structure from the old
2175	// diagram works so that you create two copies of the old Hasse diagram, you shift them up one level (points
2176	// will be segments, segments will be areas etc.) and you connect each one of the original copied polyhedrons
2177	// with its offspring by a parent-child relation. Also each of the segments in the first (second) copy is
2178	// connected to the first (second) newly created vertex by a parent-child relation.
2179	//*********************************************************************************************************
2180
2181
2182	/*
2183	// Create the vectors of vectors of pointers to polyhedrons to hold the copies of the old Hasse diagram
2184	vector<vector<polyhedron*>> new_statistic1;
2185	vector<vector<polyhedron*>> new_statistic2;
2186	*/
2187
2188	c_statistic* new_statistic1 = new c_statistic();
2189	c_statistic* new_statistic2 = new c_statistic();
2190
2191
2192	// Copy the statistic by rows
2193	for(int j=0;j<statistic.size();j++)
2194	{
2195
2196
2197	// an element counter
2198	int element_number = 0;
2199
2200	/*
2201	vector<polyhedron*> supportnew_1;
2202	vector<polyhedron*> supportnew_2;
2203
2204	new_statistic1.push_back(supportnew_1);
2205	new_statistic2.push_back(supportnew_2);
2206	*/
2207
2208	// for each polyhedron in the given row
2209	for(polyhedron* horiz_ref = statistic.rows[j];horiz_ref!=statistic.get_end();horiz_ref=horiz_ref->next_poly)
2210	{
2211	// Append an extra zero coordinate to each of the vertices for the new dimension
2212	// If vert_ref is at the first index => we loop through vertices
2213	if(j == 0)
2214	{
2215	// cast the polyhedron pointer to a vertex pointer and push a zero to its vector of coordinates
2216	((vertex*) horiz_ref)->push_coordinate(0);
2217	}
2218	/*
2219	else
2220	{
2221	((toprow) (horiz_ref))->condition.ins(0,0);
2222	}*/
2223
2224	// if it has parents
2225	if(!horiz_ref->parents.empty())
2226	{
2227	// save the relative address of this child in a vector kids_rel_addresses of all its parents.
2228	// This information will later be used for copying the whole Hasse diagram with each of the
2229	// relations contained within.
2230	for(list<polyhedron*>::iterator parent_ref = horiz_ref->parents.begin();parent_ref != horiz_ref->parents.end();parent_ref++)
2231	{
2232	(*parent_ref)->kids_rel_addresses.push_back(element_number);
2233	}
2234	}
2235
2236	// **************************************************************************************************
2237	// Here we begin creating a new polyhedron, which will be a copy of the old one. Each such polyhedron
2238	// will be created as a toprow, but this information will be later forgotten and only the polyhedrons
2239	// in the top row of the Hasse diagram will be considered toprow for later use.
2240	// **************************************************************************************************
2241
2242	// First we create vectors specifying a toprow condition. In the case of a preconstructed statistic
2243	// this condition will be a vector of zeros. There are two vectors, because we need two copies of
2244	// the original Hasse diagram.
2245	vec vec1(number_of_parameters+1);
2246	vec1.zeros();
2247
2248	vec vec2(number_of_parameters+1);
2249	vec2.zeros();
2250
2251	// We create a new toprow with the previously specified condition.
2252	toprow* current_copy1 = new toprow(vec1, 0);
2253	toprow* current_copy2 = new toprow(vec2, 0);
2254
2255	current_copy1->my_emlig = this;
2256	current_copy2->my_emlig = this;
2257
2258	// The vertices of the copies will be inherited, because there will be a parent/child relation
2259	// between each polyhedron and its offspring (comming from the copy) and a parent has all the
2260	// vertices of its child plus more.
2261	for(set<vertex*>::iterator vertex_ref = horiz_ref->vertices.begin();vertex_ref!=horiz_ref->vertices.end();vertex_ref++)
2262	{
2263	current_copy1->vertices.insert(*vertex_ref);
2264	current_copy2->vertices.insert(*vertex_ref);
2265	}
2266
2267	// The only new vertex of the offspring should be the newly created point.
2268	current_copy1->vertices.insert(new_point1);
2269	current_copy2->vertices.insert(new_point2);
2270
2271	// This method guarantees that each polyhedron is already triangulated, therefore its triangulation
2272	// is only one set of vertices and it is the set of all its vertices.
2273	simplex* t_simplex1 = new simplex(current_copy1->vertices);
2274	simplex* t_simplex2 = new simplex(current_copy2->vertices);
2275
2276	current_copy1->triangulation.insert(t_simplex1);
2277	current_copy2->triangulation.insert(t_simplex2);
2278
2279	// Now we have copied the polyhedron and we have to copy all of its relations. Because we are copying
2280	// in the Hasse diagram from bottom up, we always have to copy the parent/child relations to all the
2281	// kids and when we do that and know the child, in the child we will remember the parent we came from.
2282	// This way all the parents/children relations are saved in both the parent and the child.
2283	if(!horiz_ref->kids_rel_addresses.empty())
2284	{
2285	for(list<int>::iterator kid_ref = horiz_ref->kids_rel_addresses.begin();kid_ref!=horiz_ref->kids_rel_addresses.end();kid_ref++)
2286	{
2287	polyhedron* new_kid1 = new_statistic1->rows[j-1];
2288	polyhedron* new_kid2 = new_statistic2->rows[j-1];
2289
2290	// THIS IS NOT EFFECTIVE: It could be improved by having the list indexed for new_statistic, but
2291	// not indexed for statistic. Hopefully this will not cause a big slowdown - happens only offline.
2292	if(*kid_ref)
2293	{
2294	for(int k = 1;k<=(*kid_ref);k++)
2295	{
2296	new_kid1=new_kid1->next_poly;
2297	new_kid2=new_kid2->next_poly;
2298	}
2299	}
2300
2301	// find the child and save the relation to the parent
2302	current_copy1->children.push_back(new_kid1);
2303	current_copy2->children.push_back(new_kid2);
2304
2305	// in the child save the parents' address
2306	new_kid1->parents.push_back(current_copy1);
2307	new_kid2->parents.push_back(current_copy2);
2308	}
2309
2310	// Here we clear the parents kids_rel_addresses vector for later use (when we need to widen the
2311	// Hasse diagram again)
2312	horiz_ref->kids_rel_addresses.clear();
2313	}
2314	// If there were no children previously, we are copying a polyhedron that has been a vertex before.
2315	// In this case it is a segment now and it will have a relation to its mother (copywise) and to the
2316	// newly created point. Here we create the connection to the new point, again from both sides.
2317	else
2318	{
2319	// Add the address of the new point in the former vertex
2320	current_copy1->children.push_back(new_point1);
2321	current_copy2->children.push_back(new_point2);
2322
2323	// Add the address of the former vertex in the new point
2324	new_point1->parents.push_back(current_copy1);
2325	new_point2->parents.push_back(current_copy2);
2326	}
2327
2328	// Save the mother in its offspring
2329	current_copy1->children.push_back(horiz_ref);
2330	current_copy2->children.push_back(horiz_ref);
2331
2332	// Save the offspring in its mother
2333	horiz_ref->parents.push_back(current_copy1);
2334	horiz_ref->parents.push_back(current_copy2);
2335
2336
2337	// Add the copies into the relevant statistic. The statistic will later be appended to the previous
2338	// Hasse diagram
2339	new_statistic1->append_polyhedron(j,current_copy1);
2340	new_statistic2->append_polyhedron(j,current_copy2);
2341
2342	// Raise the count in the vector of polyhedrons
2343	element_number++;
2344
2345	}
2346
2347	}
2348
2349	/*
2350	statistic.begin()->push_back(new_point1);
2351	statistic.begin()->push_back(new_point2);
2352	*/
2353
2354	statistic.append_polyhedron(0, new_point1);
2355	statistic.append_polyhedron(0, new_point2);
2356
2357	// Merge the new statistics into the old one. This will either be the final statistic or we will
2358	// reenter the widening loop.
2359	for(int j=0;j<new_statistic1->size();j++)
2360	{
2361	/*
2362	if(j+1==statistic.size())
2363	{
2364	list<polyhedron*> support;
2365	statistic.push_back(support);
2366	}
2367
2368	(statistic.begin()+j+1)->insert((statistic.begin()+j+1)->end(),new_statistic1[j].begin(),new_statistic1[j].end());
2369	(statistic.begin()+j+1)->insert((statistic.begin()+j+1)->end(),new_statistic2[j].begin(),new_statistic2[j].end());
2370	*/
2371	statistic.append_polyhedron(j+1,new_statistic1->rows[j],new_statistic1->row_ends[j]);
2372	statistic.append_polyhedron(j+1,new_statistic2->rows[j],new_statistic2->row_ends[j]);
2373	}
2374	}
2375
2376	/*
2377	vector<list<toprow*>> toprow_statistic;
2378	int line_count = 0;
2379
2380	for(vector<list<polyhedron*>>::iterator polyhedron_ref = ++statistic.begin(); polyhedron_ref!=statistic.end();polyhedron_ref++)
2381	{
2382	list<toprow*> support_list;
2383	toprow_statistic.push_back(support_list);
2384
2385	for(list<polyhedron*>::iterator polyhedron_ref2 = polyhedron_ref->begin(); polyhedron_ref2 != polyhedron_ref->end(); polyhedron_ref2++)
2386	{
2387	toprow* support_top = (toprow)(polyhedron_ref2);
2388
2389	toprow_statistic[line_count].push_back(support_top);
2390	}
2391
2392	line_count++;
2393	}*/
2394
2395	/*
2396	vector<int> sizevector;
2397	for(int s = 0;s<statistic.size();s++)
2398	{
2399	sizevector.push_back(statistic.row_size(s));
2400	}
2401	*/
2402
2403	}
2404
2405
2406
2407
2408	};
2409
2410
2411
2412	//! Robust Bayesian AR model for Multicriteria-Laplace-Inverse-Gamma density
2413	class RARX //: public BM
2414	{
2415	private:
2416	bool has_constant;
2417
2418	int window_size;
2419
2420	list<vec> conditions;
2421
2422	public:
2423	emlig* posterior;
2424
2425	RARX(int number_of_parameters, const int window_size, bool has_constant)//:BM()
2426	{
2427	this->has_constant = has_constant;
2428
2429	posterior = new emlig(number_of_parameters);
2430
2431	this->window_size = window_size;
2432	};
2433
2434	void bayes(itpp::vec yt)
2435	{
2436	if(has_constant)
2437	{
2438	int c_size = yt.size();
2439
2440	yt.ins(c_size,1.0);
2441	}
2442
2443	if(yt.size() == posterior->number_of_parameters+1)
2444	{
2445	conditions.push_back(yt);
2446	}
2447	else
2448	{
2449	throw new exception("Wrong condition size for bayesian data update!");
2450	}
2451
2452	//posterior->step_me(0);
2453
2454	/// \TODO tohle je spatne, tady musi byt jiny vypocet poctu podminek, kdyby nejaka byla multiplicitni, tak tohle bude spatne
2455	if(conditions.size()>window_size && window_size!=0)
2456	{
2457	posterior->add_and_remove_condition(yt,conditions.front());
2458	conditions.pop_front();
2459
2460	//posterior->step_me(1);
2461	}
2462	else
2463	{
2464	posterior->add_condition(yt);
2465	}
2466
2467	}
2468
2469	};
2470
2471
2472
2473	#endif //TRAGE_H

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