Morse index theorem: Difference between revisions

Latest revision as of 19:50, 18 May 2008

Statement

Setup

Let $R^{n}$ be Euclidean space, and let $G$ be the linear space of piecewise $C^{\infty}$ -maps from $[0, T]$ to $R^{n}$ . Let $H$ denote the subspace of $G$ comprising maps which are zero at the endpoints (viz maps $u$ satisfying $u (0) = u (T) = 0$ ).

Let $P$ be a $C^{\infty}$ -map from $[0, T]$ into the collection of self-adjoint linear transformations on $R^{n}$ .

Let $U$ be the unique $C^{\infty}$ -map from $[0, T] \to H o m (R^{n}, R^{n})$ such that $U^{″} + P U = 0$ .

Define:

The multiplicity of $t \in [0, T]$ is the nullity of $U (t)$
$t \in [0, T]$ is said to be a focal point if its multiplicity is positive

Define the index form corresponding to $P$ as the following bilinear form on $H$ :

$I (u, v) = \int_{0}^{T} [(u^{'}, v^{'}) - (P u, v)] d t$

Statement part

The index $i (I)$ (viz the index of the index form) is the sum of multiplicities of all focal points in the open interval $(0, T)$
The nullity $n (I)$ (viz the nullity of the index form) is the multiplicity of $T$ .

@@ Line 9: / Line 9: @@
 Let <math>P</math> be a <math>C^\infty</math>-map from <math>[0,T]</math> into the collection of self-adjoint linear transformations on <math>\R^n</math>.
-Let <math>U</math> be the unique <math>C^\infty</math>-map from <math>[0,T]\to Home(\R^n,\R^n)</math> such that <math>U\\ + PU = 0</math>.
+Let <math>U</math> be the unique <math>C^\infty</math>-map from <math>[0,T]\to Hom(\R^n,\R^n)</math> such that <math>U'' + PU = 0</math>.
 Define: