On the length of non-solutions to equations with constants in some linear groups

Abstract

We show that for any finite-rank free group , any word-equation in one variable of length n with constants in fails to be satisfied by some element of of word-length O( (n)). By a result of the first author, this logarithmic bound cannot be improved upon for any finitely generated group . Beyond free groups, our method (and the logarithmic bound) applies to a class of groups including PSLd(Z) for all d ≥ 2, and the fundamental groups of all closed hyperbolic surfaces and 3-manifolds. Finally, using a construction of Nekrashevych, we exhibit a finitely generated group and a sequence of word-equations with constants in for which every non-solution in is of word-length strictly greater than logarithmic.