Cohomological dimension of Markov compacta

Abstract

We rephrase Gromov's definition of Markov compacta, introduce a subclass of Markov compacta defined by one building block and study cohomological dimensions of these compacta. We show that for a Markov compactum X, _(p)X=X for all but finitely many primes p where (p) is the localization of at p. We construct Markov compacta of arbitrarily large dimension having X=1 as well as Markov compacta of arbitrary large rational dimension with _pX=1 for a given p.

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