Bowditch Taut Spectrum and dimensions of groups

Abstract

For a finitely generated group G, let H(G) denote Bowditch's taut loop length spectrum. We prove that if G=(A B) / \! R \! is a C'(1/12) small cancellation quotient of a the free product of finitely generated groups, then H(G) is equivalent to H(A) H(B). We use this result together with bounds for cohomological and geometric dimensions, as well as Bowditch's construction of continuously many non-quasi-isometric C'(1/6) small cancellation 2-generated groups to obtain our main result: Let G denote the class of finitely generated groups. The following subclasses contain continuously many one-ended non-quasi-isometric groups: \G∈ G cd(G) = 2 and gd(G) = 3 \ \G∈ G cd(G) = 2 and gd(G) = 3 \ \G∈ G cdQ(G)=2 and cdZ(G)=3 \ On our way to proving the aforementioned results, we show that the classes defined above are closed under taking relatively finitely presented C'(1/12) small cancellation quotients of free products, in particular, this produces new examples of groups exhibiting an Eilenberg-Ganea phenomenon for families. We also show that if there is a finitely presented counter-example to the Eilenberg-Ganea conjecture, then there are continuously many finitely generated one-ended non-quasi-isometric counter-examples.