On the existence of representations of finitely presented groups in compact Lie groups
Abstract
Given a finite, connected 2-complex X such that b2(X)1 we establish two existence results for representations of the fundamental group of X into compact connected Lie groups G, with prescribed values on certain loops. If b2(X)=1 we assume G=SO(3) and that the cup product on the first rational cohomology group of X is non-zero.
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