nLab Morse function

Redirected from "Morse functions".

Contents

Definition
Properties
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References

Definition

(1)

f \colon M \longrightarrow \mathbb{R}

on a smooth manifold $M$ .

Definition

A point $p\in M$ is a critical point of $f$ (1) if for any smooth curve $\gamma : (-\epsilon, \epsilon)\to M$ with $\gamma(0)=p$ , the tangent vector

\frac{d(f\circ\gamma)}{dt} |_{t=0} = 0 \,.

The critical point is regular if for one (or equivalently any) chart $\phi : U^{\open}\to \mathbb{R}^n$ , where $p\in U$ and $\phi(p) = 0\in \mathbb{R}^n$ , the Hessian matrix

\left(\frac{\partial^2 (f\circ \phi^{-1})}{\partial x^i\partial x^j}(0)\right)_{i,j=1,\ldots, n}

is a nondegenerate (i.e. maximal rank) matrix.

Definition

The function $f$ is called a Morse function if every critical point of $f$ is regular (Def. ).

A choice of a Morse function on a compact manifold is often used to study topology of the manifold. This is called the Morse theory.

nLab Morse function

Contents

Definition

Definition

Definition

Properties

Related concepts

References