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edited Nov 16, 2015 at 17:03

Rank gradient in free products amalgamating a finite subgroup

Let $A,B$ be finitely generated groups with a common finite subgroup $C$. Suppose that $[A : C] > 2, [B : C] > 1$.

Must $A *_C B$ have positive rank gradient?

The assumption on the index is necessary (otherwise we take $A,B = \mathbb{Z}/2\mathbb{Z}, C = \{1\}$).

The case $C = \{1\}$ has been established by Marc Lackenby - Proposition 3.2 of http://people.maths.ox.ac.uk/lackenby/er190804.pdf

I think that there should be a proof using Bass-Serre theory.

asked Nov 16, 2015 at 16:38