Exponential equations in acylindrically hyperbolic groups

Abstract

Let G be an acylindrically hyperbolic group and E an exponential equation over G. We show that if E is solvable in G, then there exists a solution whose components, corresponding to loxodromic elements, can be linearly estimated in terms of lengths of the coefficients of E. We give a more precise answer in the case where G is a relatively hyperbolic group. Under some assumption of general character, the solvability and the search problems for exponential equations over G can be reduced to the peripheral subgroups of G.

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