369 |
|
\end{equation} |
370 |
|
where $M_i$ is a $6\times6$ generalized diagonal mass (include mass |
371 |
|
and moment of inertial) matrix and $V_i$ is a generalized velocity, |
372 |
< |
$V_i = V_i(v_i,\omega _i)$. The right side of Eq. |
372 |
> |
$V_i = V_i(v_i,\omega _i)$. The right side of Eq.~ |
373 |
|
(\ref{LDGeneralizedForm}) consists of three generalized forces in |
374 |
|
lab-fixed frame, systematic force $F_{s,i}$, dissipative force |
375 |
|
$F_{f,i}$ and stochastic force $F_{r,i}$. While the evolution of the |
516 |
|
\end{align*} |
517 |
|
|
518 |
|
\section{Results and discussion} |
519 |
+ |
|
520 |
+ |
\begin{figure} |
521 |
+ |
\centering |
522 |
+ |
\includegraphics[width=\linewidth]{one_banana.eps} |
523 |
+ |
\caption[]{.} \label{langevin:banana} |
524 |
+ |
\end{figure} |
525 |
|
|
526 |
+ |
\begin{figure} |
527 |
+ |
\centering |
528 |
+ |
\includegraphics[width=\linewidth]{temperature.eps} |
529 |
+ |
\caption[]{.} \label{langevin:temperature} |
530 |
+ |
\end{figure} |
531 |
+ |
|
532 |
|
\section{Conclusions} |