Hyperbolic graphs for free products, and the Gromov boundary of the graph of cyclic splittings

TL;DR

This paper introduces hyperbolic graphs related to free products of groups, characterizes their Gromov boundaries via equivalence classes of certain trees, and extends the understanding of cyclic splitting boundaries in geometric group theory.

Contribution

It defines new hyperbolic graphs for free products and describes their Gromov boundaries using $\

Findings

Identifies the Gromov boundary with equivalence classes of $\\mathcal{Z}$-averse trees.

Provides a description of the boundary of the graph of maximally-cyclic splittings.

Establishes hyperbolicity of the introduced graphs.

Abstract

We define analogues of the graphs of free splittings, of cyclic splittings, and of maximally-cyclic splittings of $F_N$ for free products of groups, and show their hyperbolicity. Given a countable group $G$ which splits as $G=G_1\ast\dots\ast G_k\ast F$, where $F$ denotes a finitely generated free group, we identify the Gromov boundary of the graph of relative cyclic splittings with the space of equivalence classes of $\mathcal{Z}$-averse trees in the boundary of the corresponding outer space. A tree is \emph{$\mathcal{Z}$-averse} if it is not compatible with any tree $T'$, that is itself compatible with a relative cyclic splitting. Two $\mathcal{Z}$-averse trees are \emph{equivalent} if they are both compatible with a common tree in the boundary of the corresponding outer space. We give a similar description of the Gromov boundary of the graph of maximally-cyclic splittings.