Fixed Point Theorem: Variants, Affine Context and Some Consequences

Abstract

In this work, we will present variants Fixed Point Theorem for the affine and classical contexts, as a consequence of general Brouwer's Fixed Point Theorem. For instance, the affine results will allow working on affine balls, which are defined through the affine Lp functional Ep,p introduced by Lutwak, Yang and Zhang in the work Sharp affine Lp Sobolev inequalities, J. Differential Geom. 62 (2002), 17-38 for p > 1 that is non convex and does not represent a norm in Rm. Moreover, we address results for discontinuous functional at a point. As an application, we study critical points of the sequence of affine functionals m on a subspace Wm of dimension m given by \[ m(u)=1pEp, p(u) - 1α\|u\|αLα()- ∫f(x)u dx, \] where 1<α<p, [Wm]m ∈ N is dense in W1,p0() and f∈ Lp'(), with 1p+1p'=1.