\hypertarget{classmoeo_additive_epsilon_binary_metric}{}\doxysection{moeo\+Additive\+Epsilon\+Binary\+Metric$<$ Objective\+Vector $>$ Class Template Reference}
\label{classmoeo_additive_epsilon_binary_metric}\index{moeoAdditiveEpsilonBinaryMetric$<$ ObjectiveVector $>$@{moeoAdditiveEpsilonBinaryMetric$<$ ObjectiveVector $>$}}


{\ttfamily \#include $<$moeo\+Additive\+Epsilon\+Binary\+Metric.\+h$>$}



Inheritance diagram for moeo\+Additive\+Epsilon\+Binary\+Metric$<$ Objective\+Vector $>$\+:
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Collaboration diagram for moeo\+Additive\+Epsilon\+Binary\+Metric$<$ Objective\+Vector $>$\+:
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\doxysubsection*{Public Member Functions}
\begin{DoxyCompactItemize}
\item 
double \mbox{\hyperlink{classmoeo_additive_epsilon_binary_metric_a545aa2c8e6dd93084276763c9d8a3709}{operator()}} (const \mbox{\hyperlink{classmoeo_real_objective_vector}{Objective\+Vector}} \&\+\_\+o1, const \mbox{\hyperlink{classmoeo_real_objective_vector}{Objective\+Vector}} \&\+\_\+o2)
\end{DoxyCompactItemize}
\doxysubsection*{Additional Inherited Members}


\doxysubsection{Detailed Description}
\subsubsection*{template$<$class Objective\+Vector$>$\newline
class moeo\+Additive\+Epsilon\+Binary\+Metric$<$ Objective\+Vector $>$}

Additive epsilon binary metric allowing to compare two objective vectors as proposed in Zitzler E., Thiele L., Laumanns M., Fonseca C. M., Grunert da Fonseca V.\+: Performance Assessment of Multiobjective Optimizers\+: An Analysis and Review. I\+E\+EE Transactions on Evolutionary Computation 7(2), pp.\+117–132 (2003). 

\doxysubsection{Member Function Documentation}
\mbox{\Hypertarget{classmoeo_additive_epsilon_binary_metric_a545aa2c8e6dd93084276763c9d8a3709}\label{classmoeo_additive_epsilon_binary_metric_a545aa2c8e6dd93084276763c9d8a3709}} 
\index{moeoAdditiveEpsilonBinaryMetric$<$ ObjectiveVector $>$@{moeoAdditiveEpsilonBinaryMetric$<$ ObjectiveVector $>$}!operator()@{operator()}}
\index{operator()@{operator()}!moeoAdditiveEpsilonBinaryMetric$<$ ObjectiveVector $>$@{moeoAdditiveEpsilonBinaryMetric$<$ ObjectiveVector $>$}}
\doxysubsubsection{\texorpdfstring{operator()()}{operator()()}}
{\footnotesize\ttfamily template$<$class Objective\+Vector $>$ \\
double \mbox{\hyperlink{classmoeo_additive_epsilon_binary_metric}{moeo\+Additive\+Epsilon\+Binary\+Metric}}$<$ \mbox{\hyperlink{classmoeo_real_objective_vector}{Objective\+Vector}} $>$\+::operator() (\begin{DoxyParamCaption}\item[{const \mbox{\hyperlink{classmoeo_real_objective_vector}{Objective\+Vector}} \&}]{\+\_\+o1,  }\item[{const \mbox{\hyperlink{classmoeo_real_objective_vector}{Objective\+Vector}} \&}]{\+\_\+o2 }\end{DoxyParamCaption})\hspace{0.3cm}{\ttfamily [inline]}, {\ttfamily [virtual]}}

Returns the minimal distance by which the objective vector \+\_\+o1 must be translated in all objectives so that it weakly dominates the objective vector \+\_\+o2 ~\newline
 \begin{DoxyWarning}{Warning}
don\textquotesingle{}t forget to set the bounds for every objective before the call of this function 
\end{DoxyWarning}

\begin{DoxyParams}{Parameters}
{\em \+\_\+o1} & the first objective vector \\
\hline
{\em \+\_\+o2} & the second objective vector \\
\hline
\end{DoxyParams}


Implements \mbox{\hyperlink{classeo_b_f_aa03c40b95210569b826df79a2237a0d0}{eo\+B\+F$<$ const Objective\+Vector \&, const Objective\+Vector \&, double $>$}}.



The documentation for this class was generated from the following file\+:\begin{DoxyCompactItemize}
\item 
moeo/src/metric/moeo\+Additive\+Epsilon\+Binary\+Metric.\+h\end{DoxyCompactItemize}