Banach-Stone-like results for combinatorial Banach spaces

Abstract

We show that under a certain topological assumption on two compact hereditary families and on some infinite cardinal , the corresponding combinatorial spaces X and X are isometric if and only if there is a permutation of inducing a homeomorphism between and . We also prove that two different regular families and on ω cannot be permuted one to the other. Both these results strengthen the main result of BrechFerencziTcaciuc.