Quasi-isomorphism

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In applied mathematics and the calculus of variations, the first variation of a functional J(y) is defined as the linear functional δJ(y) mapping the function h to

δJ(y)(h)=limε0J(y+εh)J(y)ε=ddεJ(y+εh)|ε=0,

where y and h are functions, and ε is a scalar.

Example

Compute the first variation of

J(y)=abyydx.

From the definition above,

δJ(y)(h)=ddεJ(y+εh)|ε=0=ddεab(y+εh)(y+εh)dx|ε=0=ddεab(yy+yεh+yεh+ε2hh)dx|ε=0=abddε(yy+yεh+yεh+ε2hh)dx|ε=0=ab(yh+yh+2εhh)dx|ε=0=ab(yh+yh)dx

See also

External links

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