Local to global property in free groups
Abstract
The local to global property for an equation over a group G asks to show that is solvable in G if and only if it is solvable in every finite quotient of G. In this paper we focus that in order to prove this local to global property for free groups G=Fk, it is enough to prove for k less or equal the number of parameters in . In particular we use it to show that the local to global property holds for m-powers in free groups.
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