\section{diffbifn Class Reference} \label{classdiffbifn}\index{diffbifn@{diffbifn}} Class representing a differentiable function of two variables $f(x,u)$. {\tt \#include $<$libFN.h$>$} Inheritance diagram for diffbifn:\nopagebreak \begin{figure}[H] \begin{center} \leavevmode \includegraphics[width=121pt]{classdiffbifn__inherit__graph} \end{center} \end{figure} Collaboration diagram for diffbifn:\nopagebreak \begin{figure}[H] \begin{center} \leavevmode \includegraphics[width=60pt]{classdiffbifn__coll__graph} \end{center} \end{figure} \subsection*{Public Member Functions} \begin{CompactItemize} \item vec {\bf eval} (const vec \&cond)\label{classdiffbifn_ad7673e16aa1a046b131b24c731c4632} \begin{CompactList}\small\item\em Evaluates $f(x0,u0)$ (VS: Do we really need common eval? ). \item\end{CompactList}\item virtual vec {\bf eval} (const vec \&x0, const vec \&u0)\label{classdiffbifn_40d8a7eee45acc55cda33d43282faa03} \begin{CompactList}\small\item\em Evaluates $f(x0,u0)$. \item\end{CompactList}\item virtual void {\bf dfdx\_\-cond} (const vec \&x0, const vec \&u0, mat \&A, bool full=true) \begin{CompactList}\small\item\em Evaluates $A=\frac{d}{dx}f(x,u)|_{x0,u0}$ and writes result into {\tt A} . \item\end{CompactList}\item virtual void {\bf dfdu\_\-cond} (const vec \&x0, const vec \&u0, mat \&A, bool full=true) \begin{CompactList}\small\item\em Evaluates $A=\frac{d}{du}f(x,u)|_{x0,u0}$ and writes result into {\tt A} . \item\end{CompactList}\item {\bf diffbifn} (int {\bf dimy}, const {\bf RV} rvx0, const {\bf RV} rvu0)\label{classdiffbifn_797772c0d5aab8ddccec19dfe4bb2d77} \begin{CompactList}\small\item\em Default constructor (dimy is not set!). \item\end{CompactList}\item int {\bf \_\-dimx} () const \label{classdiffbifn_436de7a7301ea9eac7d6081b893bbf57} \begin{CompactList}\small\item\em access function \item\end{CompactList}\item int {\bf \_\-dimu} () const \label{classdiffbifn_fc8779acbff170611aff0ee70cee3879} \begin{CompactList}\small\item\em access function \item\end{CompactList}\item int {\bf \_\-dimy} () const \label{classfnc_a8891973d0ca48ce38e1886df45ca298} \begin{CompactList}\small\item\em access function \item\end{CompactList}\end{CompactItemize} \subsection*{Protected Attributes} \begin{CompactItemize} \item {\bf RV} {\bf rvx}\label{classdiffbifn_bcf96b86250c3cbd465ba5ee62474b75} \begin{CompactList}\small\item\em Indentifier of the first rv. \item\end{CompactList}\item {\bf RV} {\bf rvu}\label{classdiffbifn_c41c74c7942dba51ef0b0bfed963447d} \begin{CompactList}\small\item\em Indentifier of the second rv. \item\end{CompactList}\item int {\bf dimx}\label{classdiffbifn_f6918bc0a9dad656b4cddc028137eb78} \begin{CompactList}\small\item\em cache for rvx.count() \item\end{CompactList}\item int {\bf dimu}\label{classdiffbifn_2e07ce491e973f03d763e37624d0fe79} \begin{CompactList}\small\item\em cache for rvu.count() \item\end{CompactList}\item int {\bf dimy}\label{classfnc_22d51d10a7901331167f64f80d1af8e9} \begin{CompactList}\small\item\em Length of the output vector. \item\end{CompactList}\end{CompactItemize} \subsection{Detailed Description} Class representing a differentiable function of two variables $f(x,u)$. Function of two variables. TODO: 1) Technically, it could have a common parent (e.g. {\tt \doxyref{fnc}{p.}{classfnc}} ) with other functions. For now, we keep it as it is. 2) It could be generalized into multivariate form, (which was original meaning of {\tt \doxyref{fnc}{p.}{classfnc}} ). \subsection{Member Function Documentation} \index{diffbifn@{diffbifn}!dfdx\_\-cond@{dfdx\_\-cond}} \index{dfdx\_\-cond@{dfdx\_\-cond}!diffbifn@{diffbifn}} \subsubsection[dfdx\_\-cond]{\setlength{\rightskip}{0pt plus 5cm}virtual void diffbifn::dfdx\_\-cond (const vec \& {\em x0}, \/ const vec \& {\em u0}, \/ mat \& {\em A}, \/ bool {\em full} = {\tt true})\hspace{0.3cm}{\tt [inline, virtual]}}\label{classdiffbifn_6d217a02d4fa13931258d4bebdd0feb4} Evaluates $A=\frac{d}{dx}f(x,u)|_{x0,u0}$ and writes result into {\tt A} . \begin{Desc} \item[Parameters:] \begin{description} \item[{\em full}]denotes that even unchanged entries are to be rewritten. When, false only the changed elements are computed. \item[{\em x0}]numeric value of $x$, \item[{\em u0}]numeric value of $u$ \item[{\em A}]a place where the result will be stored. \end{description} \end{Desc} Reimplemented in {\bf bilinfn} \doxyref{}{p.}{classbilinfn_79c022de8dbe2b054bb9cc49345f3ef5}, {\bf IMpmsm} \doxyref{}{p.}{classIMpmsm_b4378b5d3bf64c683e4cf5c5f1cd56f1}, and {\bf OMpmsm} \doxyref{}{p.}{classOMpmsm_b75b5fd55b2ac5ed74b5b953af122821}. Referenced by EKF$<$ sq\_\-T $>$::bayes(), EKFCh::bayes(), EKFfull::bayes(), EKF$<$ sq\_\-T $>$::set\_\-parameters(), EKFCh::set\_\-parameters(), and EKFfull::set\_\-parameters().\index{diffbifn@{diffbifn}!dfdu\_\-cond@{dfdu\_\-cond}} \index{dfdu\_\-cond@{dfdu\_\-cond}!diffbifn@{diffbifn}} \subsubsection[dfdu\_\-cond]{\setlength{\rightskip}{0pt plus 5cm}virtual void diffbifn::dfdu\_\-cond (const vec \& {\em x0}, \/ const vec \& {\em u0}, \/ mat \& {\em A}, \/ bool {\em full} = {\tt true})\hspace{0.3cm}{\tt [inline, virtual]}}\label{classdiffbifn_1978bafd7909d15c139a08c495c24aa0} Evaluates $A=\frac{d}{du}f(x,u)|_{x0,u0}$ and writes result into {\tt A} . \begin{Desc} \item[Parameters:] \begin{description} \item[{\em full}]denotes that even unchanged entries are to be rewritten. When, false only the changed elements are computed. \item[{\em x0}]numeric value of $x$, \item[{\em u0}]numeric value of $u$ \item[{\em A}]a place where the result will be stored. \end{description} \end{Desc} Reimplemented in {\bf bilinfn} \doxyref{}{p.}{classbilinfn_90f2b15612b14883d6ed2b0e295cb82b}, and {\bf IMpmsm} \doxyref{}{p.}{classIMpmsm_c3f8dad22ae9855c04a1d593b45c99b5}. The documentation for this class was generated from the following file:\begin{CompactItemize} \item work/git/mixpp/bdm/stat/libFN.h\end{CompactItemize}