📝 SummarXiv

Abstract

This paper presents new approaches to the fixed point property for nonexpansive mappings in L^1 spaces. While it is well-known that L^1 fails the fixed point property in general, we provide a complete and self-contained proof that measure-compactness of a convex set is a sufficient condition. Our exposition makes all compactness and uniform integrability arguments explicit, offering a clear path from measure-theoretic compactness to weak compactness, normal structure, and ultimately fixed points via Kirk's theorem. Beyond this geometric approach, we contextualize this result within broader structural strategies for obtaining fixed points in L^1 and related spaces. We discuss the roles of ultraproducts, equivalent renormings that induce uniform convexity on l^1, and the fixed point property in non-reflexive spaces like Lorentz sequence spaces. This work unifies these perspectives, demonstrating that the obstruction to fixed points in L^1 is not the space itself but specific geometric or structural properties of its subsets. The results clarify the landscape of fixed point theory in non-reflexive Banach spaces.