Degree of satisfiability of some special equations

Abstract

A well-known theorem of Gustafson states that in a non-Abelian group the degree of satisfiability of xy=yx, i.e. the probability that two uniformly randomly chosen group elements x,y obey the equation xy=yx, is no larger than 58. The seminal work of Antolin, Martino and Ventura (arXiv:1511.07269) on generalizing the degree of satisfiability to finitely generated groups led to renewed interest in Gustafson-style properties of other equations. Positive results have recently been obtained for the 2-Engel and metabelian identities (arXiv:1809.02997). Here we show that the degree of satisfiability of the equations xy2=y2x, xy3=y3x and xy=yx-1 is either 1, or no larger than 1- for some positive constant . Using the Antolin-Martino-Ventura formalism, we introduce criteria to identify which equations hold in a finite index subgroup precisely if they have positive degree of satisfiability. We deduce that the equations xy=yx-1 and xy2=y2x do not have this property.