Weierstrass–Erdmann condition

The Weierstrass–Erdmann condition is a mathematical result from the calculus of variations, which specifies sufficient conditions for broken extremals (that is, an extremal which is constrained to be smooth except at a finite number of "corners").^[1]

The Weierstrass-Erdmann corner conditions stipulate that a broken extremal ${\displaystyle y(x)}$ of a functional ${\displaystyle J=\underset{a}{\overset{b}{\int }}f(x,y,y^{\prime })dx}$ satisfies the following two continuity relations at each corner ${\displaystyle c\in [a,b]}$:

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The condition allows one to prove that a corner exists along a given extremal. As a result, there are many applications to differential geometry. In calculations of the Weierstrass E-Function, it is often helpful to find where corners exist along the curves. Similarly, the condition allows for one to find a minimizing curve for a given integral.

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