计算Grassmannian geodesic
作者:互联网
Solving for geodesic is a classical problem in the calculus of variation.
In Grassmann manifold, there exists relatively simple method of computing geodesics using the relatively simple method bsed on the SVD.
计算Grassmannian Geodesic:
Given 2 points on grassmann manifold, $X,Y\in \mathcal{G}\left( D,p \right)$ may be parametrized by a function $\varPhi \left( t \right) :\left[ 0,1 \right] \rightarrow \mathcal{G}\left( D,p \right)$, where $\varPhi \left( 0 \right)=X$ and $\varPhi \left( 1 \right)=Y$. The parameter $t\in\left[0,1\right]$ controls the location on the geodesic on Grassmannian.
First,
标签:right,manifold,simple,geodesic,varPhi,Grassmannian,计算,left 来源: https://www.cnblogs.com/jumanggege/p/10768263.html