Rational growth in virtually abelian groups

“…In combination with inequalities ( 7), ( 8), (9), and (10) above, Corollary 4.5 shows that RC(σ V ) ≤ RC(σ V ).…”

“…The first conjugacy growth series computations appeared in the work of Rivin ([18,19]) on free groups, and it is striking that, even for free groups with standard generating sets, the series are transcendental, and their formulas rather complicated. More generally and systematically, conjugacy growth series and languages featured in [2,6,7,3,9,17], where virtually abelian groups, acylindrically hyperbolic groups, free and wreath products, and more, were explored.…”

Formal conjugacy growth in graph products I

“…In combination with inequalities ( 7), ( 8), (9), and (10) above, Corollary 4.5 shows that RC(σ V ) ≤ RC(σ V ).…”

“…The first conjugacy growth series computations appeared in the work of Rivin ([18,19]) on free groups, and it is striking that, even for free groups with standard generating sets, the series are transcendental, and their formulas rather complicated. More generally and systematically, conjugacy growth series and languages featured in [2,6,7,3,9,17], where virtually abelian groups, acylindrically hyperbolic groups, free and wreath products, and more, were explored.…”

Formal conjugacy growth in graph products I

“…Ciobanu, Hermiller, Holt and Rees [7] and Antolín and Ciobanu [1] confirmed a conjecture of Rivin [29], that the conjugacy growth series of a hyperbolic group is a rational function if and only if the group is virtually cyclic. Continuing in a similar vein, the author proved the rationality of the series for all virtually abelian groups [12], and Gekhtman and Yang proved transcendence for relatively hyperbolic groups and certain acylindrically hyperbolic groups [17]. All of the above results apply to any choice of finite generating set, and lead to the following conjecture: Conjecture 1.1 (Conjecture 7.2 of [6]).…”

Conjugacy growth in the higher Heisenberg groups

“…The following definitions and results follow Benson's work [Ben83], where it is proved that virtually abelian groups have rational (standard) growth series. More recently, polyhedral sets have again been used to prove rationality of various growth series of groups ([DS19], [Eve19]). Definition 2.2.…”

“…This relative growth has been studied in many papers, including [DO15]. The relative growth series of any subgroup of virtually abelian groups was shown to be rational in [Eve19]. In Section 4 we consider the relative growth of the solution set of any system of equations in a virtually abelian group, either as a subset of the group, or as a set of tuples of group elements (with an appropriate metric) in the case of equations in multiple variables.…”

Equations in virtually abelian groups: languages and growth