On Cartwright-Littlewood Fixed Point Theorem

Abstract

We prove the following generalization of the Cartwright-Littlewood fixed point theorem. Suppose h~ R2 R2 is an orientation preserving planar homeomorphism, and X is an acyclic continuum. Let C be a component of X h(X) . If there is a c ∈ C such that O+ (c) ⊂eq C or O- (c) ⊂eq C then C also contains a fixed point of h. Our result also generalizes earlier results of Ostrovski and Boro\'nski, and answers the Question from Boro\'nski's work in 2017. The proof is inspired by a short proof of the result of Cartwright and Littlewood due to Hamilton.