# Virtual algebraic fibrations of K\"ahler groups

**Authors:** Stefan Friedl, Stefano Vidussi

arXiv: 1704.07041 · 2023-06-22

## TL;DR

This paper investigates the algebraic fibrations of K"ahler groups, showing that most virtually fiber and exploring the implications for their structure, especially relating to surface groups and their invariants.

## Contribution

It demonstrates that most K"ahler groups virtually algebraically fiber and characterizes those with low Albanese dimension, linking their properties to surface groups and invariants.

## Key findings

- Most K"ahler groups virtually fiber over Z.
- Groups with Albanese dimension ≤ 1 relate closely to surface groups.
- Green–Lazarsfeld sets of these groups match those of surface groups.

## Abstract

This paper stems from the observation (arising from work of T. Delzant) that "most" K\"ahler groups virtually algebraically fiber, i.e. admit a finite index subgroup that maps onto $\Bbb{Z}$ with finitely generated kernel. For the remaining ones, the Albanese dimension of all finite index subgroups is at most one, i.e. they have virtual Albanese dimension $va(G) \leq 1$. We show that the existence of algebraic fibrations has implications in the study of coherence and higher BNSR invariants of the fundamental group of aspherical K\"ahler surfaces. The class of K\"ahler groups with $va(G) \leq 1$ includes virtual surface groups. Further examples exist; nonetheless they exhibit a strong relation with surface groups. In fact, we show that the Green--Lazarsfeld sets of groups with $va(G) = 1$ (virtually) coincide with those of surface groups, and furthermore that the only virtually RFRS groups with $va(G) = 1$ are virtually surface groups.

## Full text

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## References

52 references — full list in the complete paper: https://tomesphere.com/paper/1704.07041/full.md

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Source: https://tomesphere.com/paper/1704.07041