Closure properties of knapsack semilinear groups

Abstract

We show that the following group constructions preserve the semilinearity of the solution sets for knapsack equations (equations of the form g1x1 ·s gkxk = g in a group G, where the variables x1, …, xk take values in the natural numbers): graph products, amalgamated free products with finite amalgamated subgroups, HNN-extensions with finite associated subgroups, and finite extensions. Moreover, we study the dependence of the so-called magnitude for the solution set of a knapsack equation (the magnitude is a complexity measure for semi-linear sets) with respect to the length of the knapsack equation (measured in number of generators). We investigate, how this dependence changes under the above group operations.