A Hurewicz-type theorem for quasimorphisms of countable approximate groups

Abstract

In their theorem from 2006, A. Dranishnikov and J. Smith prove that if f:G H is a group homomorphism, then the following formula for asymptotic dimension is true: asdim G ≤ asdim H + asdim ( f). This result is known as the Hurewicz-type formula, after a 1927 theorem from classical dimension theory by W. Hurewicz, which inspired it. In this paper we establish a similar formula to the one by Dranishnikov and Smith, for the following setup: whenever (, ∞) and (,∞) are countable approximate groups and f:(, ∞) (,∞) is a (general) quasimorphism, i.e., a quasimorphism which need not be symmetric nor unital, then the following formula is true: asdim ≤ asdim + asdim (f-1(f(e)D(f)-1D(f))), where D(f) is the defect set of f. It follows as a corollary that if f:G H is a quasimorphism of countable groups, then asdim G≤ asdim H + asdim (f-1(f(e)D(f)-1D(f))).

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