The space of marked Dyer systems, monotonicity, and continuity of growth rates

Abstract

The space Gn of n-marked groups provides a natural framework for studying algebraic and geometric invariants under deformation. In general, the growth rate is not continuous on Gn. In this paper, we investigate the subspace Dn ⊂ Gn consisting of n-marked Dyer systems, which extend Coxeter systems and include graph products of cyclic groups and right-angled Artin groups. We prove that Dn is closed in Gn and introduce a natural partial order on Dn with respect to which the growth rate is monotonically increasing. As a consequence, the growth rate function τ : Dn R≥ 1 is continuous. The proof combines the solution to the word problem for Dyer systems by Paris and Soergel, the parabolic growth formula by Paris and Varghese, and analytic arguments based on normal convergence and Hurwitz's theorem. This extends the continuity results known for Coxeter systems to the broader class of Dyer systems.