On the number of tuples of group elements satisfying a first-order formula
Abstract
Our result contains as special cases the Frobenius theorem (1895) on the~number of solutions to the equation xn=1 in a finite group and the Solomon theorem (1969) on the number of solutions in a group to systems of equations with fewer equations than unknowns. Instead of systems of equations, we consider arbitrary first-order formulae in the group language with constants. Our result substantially generalizes the Klyachko--Mkrtchyan theorem (2014) on this topic.
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