Abstract and Applied Analysis
Volume 2003 (2003), Issue 7, Pages 407-433
doi:10.1155/S1085337503211015

Revisiting Cauty's proof of the Schauder conjecture

Abstract

The Schauder conjecture that every compact convex subset of a metric linear space has the fixed-point property was recently established by Cauty (2001). This paper elaborates on Cauty's proof in order to make it more detailed, and therefore more accessible. Such a detailed analysis allows us to show that the convex compacta in metric linear spaces possess the simplicial approximation property introduced by Kalton, Peck, and Roberts. The latter demonstrates that the original Schauder approach to solve the conjecture is in some sense "correctable."