The Morse-Sard-Brown Theorem for Functionals on Bounded-Fr\'echet-Finsler Manifolds

Abstract

In this paper, we study Lipschitz-Fredholm vector fields on Bounded-Fr\'echet-Finsler manifolds. In this context we generalize the Morse-Sard-Brown theorem, asserting that if M is a connected smooth bounded-Fr\'echet-Finsler manifold endowed with a strengthened connection K and if is a smooth Lipschitz-Fredholm vector field on M with respect to K which satisfies condition (CV). Then, for any smooth functional l on M which is associated to , the set of the critical values of l is of the first category in . Therefore, the set of the regular values of l is a residual Baire subset of R.