English

Weak commutativity, virtually nilpotent groups, and Dehn functions

Group Theory 2023-08-22 v2

Abstract

The group X(G)\mathfrak{X}(G) is obtained from GGG\ast G by forcing each element gg in the first free factor to commute with the copy of gg in the second free factor. We make significant additions to the list of properties that the functor X\mathfrak{X} is known to preserve. We also investigate the geometry and complexity of the word problem for X(G)\mathfrak{X}(G). Subtle features of X\mathfrak{X} are encoded in a normal abelian subgroup W<X(G)W<\mathfrak{X}(G) that is a module over ZQ\mathbb{Z} Q, where Q=H1(G,Z)Q= H_1(G,\mathbb{Z}). We establish a structural result for this module and illustrate its utility by proving that X\mathfrak{X} preserves virtual nilpotence, the Engel condition, and growth type -- polynomial, exponential, or intermediate. We also use it to establish isoperimetric inequalities for X(G)\mathfrak{X}(G) when GG lies in a class that includes Thompson's group FF and all non-fibered K\"ahler groups. The word problem is solvable in X(G)\mathfrak{X}(G) if and only if it is solvable in GG. The Dehn function of X(G)\mathfrak{X}(G) is bounded below by a cubic polynomial if GG maps onto a non-abelian free group.

Keywords

Cite

@article{arxiv.2202.03796,
  title  = {Weak commutativity, virtually nilpotent groups, and Dehn functions},
  author = {Martin R. Bridson and Dessislava H. Kochloukova},
  journal= {arXiv preprint arXiv:2202.03796},
  year   = {2023}
}

Comments

25 pages, no figures. Final version. Accepted for publication in Commentarii Mathematici Helvetici

R2 v1 2026-06-24T09:25:59.407Z