New topological methods to solve equations over groups
Abstract
We show that the equation associated with a group word w ∈ G F2 can be solved over a hyperlinear group G if its content - that is its augmentation in F2 - does not lie in the second term of the lower central series of F2. Moreover, if G is finite, then a solution can be found in a finite extension of G. The method of proof extends techniques developed by Gerstenhaber and Rothaus, and uses computations in p-local homotopy theory and cohomology of compact Lie groups.
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