Points fixes et théorèmes ergodiques dans les espaces L¹(E)
Volume 103 / 1992
Studia Mathematica 103 (1992), 79-97
DOI: 10.4064/sm-103-1-79-97
Abstract
We prove that for each linear contraction T : X → X (∥T∥ ≤ 1), the subspace F = {x ∈ X : Tx = x} of fixed points is 1-complemented, where X is a suitable subspace of L¹(E*) and E* is a separable dual space such that the weak and weak* topologies coincide on the unit sphere. We also prove some related fixed point results.