Variational inequalities

Abstract

If - ∞ < α < β < ∞ and f ∈ C3 ( [ α , β ] × R2 , R ) is bounded, while y ∈ C2 ( [ α , β ] , R ) solves the typical one-dimensional problem of the calculus of variations to minimize the function F ( y ) = ∫ α β f ( x, y(x), y'(x) ) dx, then for any φ ∈ C2 ( [ α , β ] , R ) for which φ (k)( α ) = φ (k)( β ) = 0 for every k ∈ \ 0, 1, 2 \ , we prove that ∫α β ( ∂ 2f ∂ y2 φ 2 - ∂ 3f ∂ y2 ∂ y' 2 φ 3 ) dx ≥ ∫α β ( ∂ 2f ∂ y ∂ y' 2 φ φ ' + ∂ 3f ∂ y ∂ y'2 2 φ 2 φ ' + ∂ 2f ∂ y'2 φ φ " + ∂ 3f ∂ y ∂ y'2 φ ' φ 2 + ∂ 3f ∂ y'3 φ φ '2 ) dx, so either the above are variational inequalities of motion or the Lagrangian of motion is not C3.