Weierstrass-Erdmann corner conditions

Necessary conditions for an extremum, additional to the Euler equation, specified at points at which the extremal has a corner. Let

be a functional of the classical calculus of variations (cf. Variational calculus), and let the extremal be continuously differentiable in a neighbourhood of the point except at the point itself, at which it has a corner. In this situation, for to be at least a weak local extremum for the functional , it is necessary that the equations

where

and

be satisfied at the corner point . These equations are known as the corner conditions of K. Weierstrass (1865) and G. Erdmann (1877) [1].

The meaning of the Weierstrass–Erdmann corner conditions is that the canonical variables and the Hamiltonian are continuous at a corner point of the extremal; their meaning in classical mechanics is the continuity of momentum and of energy at a corner point.

In regular problems, when is a strictly convex function of , the extremals cannot have corner points. Corner points appear if and consequently the Weierstrass -function, contains segments of . For the Lagrange problem with conditions and Lagrange multipliers , the in the Weierstrass–Erdmann corner conditions is replaced by .

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Comments

See also Weierstrass conditions (for a variational extremum).

References