Retract or Not: A Tale of Two Fans

Abstract

Let X be a Lelek fan or a Cantor fan and let Y be a Lelek fan or a Cantor fan. In this paper, we study embeddings f: X Y that admit retractions from Y onto f(X). In 1989, W. J. Charatonik and J. J. Charatonik proved that if X is a Lelek fan and Y is a Cantor fan, then no embedding f of X into Y admits a retraction from Y onto f(X). They also showed that if both X and Y are Cantor fans, then every embedding f of X into Y admits such a retraction. In this paper, we address the two remaining cases. First, we consider the situation where X is a Cantor fan and Y is a Lelek fan. We prove that in this case, every embedding f of X into Y admits a retraction from Y onto f(X). Second, we examine the case where both X and Y are Lelek fans. Here, we show that there exist embeddings f that do admit a retraction from Y onto f(X), as well as embeddings that do not. For this latter case, we also identify additional properties of embeddings that ensure the existence of a retraction from Y onto f(X).