p-solvability of regular equations over unitriangular groups over prime finite fields

Abstract

An equation over a group with one unknown is called regular if the exponent sum of the unknown is nonzero. In this paper we prove that some regular equations of exponent rps, where r ∈ Z, s ∈ N, (r,p)=1, over the group UTn(Fp) (n ≥ 2) are solvable in an overgroup isomorphic to UT(n-1)ps + 1(Fp). Applying this for n=3 we prove that any regular equation of exponent rps over the Heisenberg p-group UT3(Fp) is solvable in an overgroup isomorphic to UT2ps + 1(Fp). The proofs of these results are constructive and allow to obtain solutions of equations in explicit form.