A remark on variational inequalities in small balls

Abstract

In this paper, we prove the following result: Let (H,·,·) be a real Hilbert space, B a ball in H centered at 0 and :B H a C1,1 function, with (0)≠ 0, such that the function x (x),x-y is weakly lower semicontinuous in B for all y∈ B. Then, for each r>0 small enough, there exists a unique point x*∈ H, with \|x*\|=r, such that \ (x*),x*-y, (y),x*-y\< 0 for all y∈ H \x*\, with \|y\|≤ r.