A note on home-product-minimality
Abstract
A compact space Y is called homeo-product-minimal if given any minimal system (X,T), it admits a homeomorphism S:Y Y, such that the product system (X× Y,T× S) is minimal. We show that a large class of cofrontiers is homeo-product-minimal. This class contains R. H. Bing's pseudo-circle, answering a question of Dirb\'ak, Snoha and Spitalsk\'y from [Minimal direct products, Trans. Amer. Math. Soc. 375 (2022)].
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