Variation of a path: Difference between revisions

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{{further|[[Piecewise smooth variation]]}}
{{further|[[Piecewise smooth variation]]}}


A piecewise smooth variation is a variation for which we can find <math>o = s_1 < s_2 < \ldots < s_r</math> such that <math>a\lpha</math> restricted to <math>(-\epsilon,\epsilon) \times [s_{i-1},s_i]</math> is smooth for <math>1 \le i \le r</math>. Note that only a [[piecewise smooth path]] can admit a piecewise smooth variation.
A piecewise smooth variation is a variation for which we can find <math>o = s_1 < s_2 < \ldots < s_r</math> such that <math>\alpha</math> restricted to <math>(-\epsilon,\epsilon) \times [s_{i-1},s_i]</math> is smooth for <math>1 \le i \le r</math>. Note that only a [[piecewise smooth path]] can admit a piecewise smooth variation.

Revision as of 09:43, 5 August 2007

Definition

Let M be a differential manifold and ω a path in M. A variation of ω is a map α:(ϵ,ϵ)×[0,1]M such that α(0,t)=ω(t)t.

For a given

Properties

Smooth variation

Further information: Smooth variation

A smooth variation is a variation for which the map α is smooth from the product manifold to M. Note that only a smooth path can admit a smooth variation,

Piecewise smooth variation

Further information: Piecewise smooth variation

A piecewise smooth variation is a variation for which we can find o=s1<s2<<sr such that α restricted to (ϵ,ϵ)×[si1,si] is smooth for 1ir. Note that only a piecewise smooth path can admit a piecewise smooth variation.