Autohomeomorphisms of the finite powers of the double arrow
Abstract
Let A and S denote the double arrow of Alexandroff and the Sorgenfrey line, respectively. We show that any homeomorphism h:mAmA is locally (outside of a nowhere dense set) a product of monotone embeddings hi:Ji⊂eq A (i∈ m) followed by a permutation of the coordinates. We also prove that the symmetric products Fm(A) are not homogeneous for any m≥ 2. This partially solves an open question of A. Arhangel'skii. In contrast, we show that symmetric product F2(S) is homogeneous.
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