Cellular waists of hyperbolic spaces
Abstract
We find lower bounds on the topological complexity of fibers of PL and generic smooth maps p:Md→ Rm, where Md is a closed hyperbolic manifold of large injectivity radius. More precisely, we show that if the injectivity radius of M is greater than 50((n+1)!), then for each dimension 0<k<d-m there is a point z∈ Rm such that any cell structure on the fiber p-1(z) has more than n cells of dimension k. The proof is based on a freedom theorem for ideals in group rings of hyperbolic groups proved in arXiv:2309.16791.
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