The ratio of homology rank to hyperbolic volume, I

Abstract

We show that for every finite-volume hyperbolic 3-manifold M and every prime p we have dim\ H1(M;Fp)< 168.602·vol\ M. There are slightly stronger estimates if p = 2 or if M is non-compact. This improves on a result proved by Agol, Leininger and Margalit, which gave the same inequality with a coefficient of 334.08 in place of 168.602. It also improves on the analogous result with a coefficient of about 260, which could have been obtained by combining the arguments due to Agol, Leininger and Margalit with a result due to B\"or\"oczky. Our inequality involving homology rank is deduced from a result about the rank of the fundamental group: if M is a finite-volume orientable hyperbolic 3-manifold such that π1(M) is 2-semifree, then rank\ π1(M)<1+λ0·vol\ M, where λ0 is a certain constant less than 167.79

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