Simplicial resolutions and Ganea fibrations
Abstract
In this work, we compare the two approximations of a path-connected space X, by the Ganea spaces Gn(X) and by the realizations \| X\|n of the truncated simplicial resolutions emerging from the loop-suspension cotriple . For a simply connected space X, we construct maps \| X\|n-1 Gn(X) \| X\|n over X, up to homotopy. In the case n=2, we prove the existence of a map G2(X)\| X\|1 over X (up to homotopy) and conjecture that this map exists for any n.
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