mEF mpdf mgamma mlnorm< sq_T > libEF.h mEF::mEF (const RV &rv0, const RV &rvc0) mEF const RV & rv0 const RV & rvc0 Default constructor. vec virtual vec mpdf::samplecond (const vec &cond, double &ll) samplecond const vec & cond double & ll Returns the required moment of the epdf. Returns a sample from the density conditioned on cond, $x \sim epdf(rv|cond)$. cond is numeric value of rv ll is a return value of log-likelihood of the sample. mpdf::condition mpdf::ep epdf::evalpdflog epdf::sample MPF< BM_T >::bayes PF::bayes mat virtual mat mpdf::samplecond (const vec &cond, vec &ll, int N) samplecond const vec & cond vec & ll int N Returns. N samples from the density conditioned on cond, $x \sim epdf(rv|cond)$. cond is numeric value of rv ll is a return value of log-likelihood of the sample. mpdf::condition RV::count mpdf::ep epdf::evalpdflog mpdf::rv epdf::sample void virtual void mpdf::condition (const vec &cond) condition condition condition condition const vec & cond Update ep so that it represents this mpdf conditioned on rvc = cond. mpdf::evalcond mpdf::samplecond double virtual double mpdf::evalcond (const vec &dt, const vec &cond) evalcond const vec & dt const vec & cond Shortcut for conditioning and evaluation of the internal epdf. In some cases, this operation can be implemented efficiently. mpdf::condition mpdf::ep epdf::eval PF::bayes RV RV mpdf::_rvc () _rvc access function mpdf::rvc merger::merger RV RV mpdf::_rv () _rv access function mpdf::rv mprod::mprod epdf & epdf& mpdf::_epdf () _epdf access function mpdf::ep RV RV mpdf::rv rv modeled random variable mpdf::_rv mprod::mprod mlnorm< sq_T >::samplecond mpdf::samplecond mlnorm< sq_T >::set_parameters mgamma::set_parameters RV RV mpdf::rvc rvc random variable in condition mpdf::_rvc mprod::mprod epdf * epdf* mpdf::ep ep pointer to internal epdf mpdf::_epdf mpdf::evalcond mepdf::mepdf mlnorm< sq_T >::mlnorm mmix::mmix mpdf::samplecond mgamma::set_parameters Exponential family model. More?... mgamma mpdf mlnorm< sq_T > mEF mgamma_fix epdf rv RV mpdf rv rvc ep mEF mEF_epdf mEF_rv mEF_rvc mEFcondition mEFep mEFevalcond mEFmEF mEFmpdf mEFrv mEFrvc mEFsamplecond mEFsamplecond mEF~mpdf