# Intersections of subgroups in virtually free groups and virtually free   products

**Authors:** Anton A. Klyachko, Anastasia N. Ponfilenko

arXiv: 1904.07350 · 2020-03-06

## TL;DR

This paper generalizes the Friedman--Mineyev theorem to virtually free groups, providing bounds on the rank of intersections of free subgroups and extending the results to virtually free products.

## Contribution

It offers a short proof of a generalized Hanna Neumann-type inequality for virtually free groups and extends the result to virtually free products.

## Key findings

- Proved a generalized Hanna Neumann inequality for virtually free groups.
- Extended the intersection bounds to virtually free products.
- Provided a concise proof of the generalized theorem.

## Abstract

This note contains a (short) proof of the following generalisation of the Friedman--Mineyev theorem (earlier known as the Hanna Neumann conjecture): if $A$ and $B$ are nontrivial free subgroups of a virtually free group containing a free subgroup of index $n$, then $rank(A\cap B)-1\leqslant n\cdot(rank(A)-1)\cdot(rank(B)-1)$. In addition, we obtain a virtually-free-product analogue of this result.

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Source: https://tomesphere.com/paper/1904.07350