Topologically nontrivial counterexamples to Sard's theorem
Abstract
We prove the following dichotomy: if n=2,3 and f∈ C1(Sn+1,Sn) is not homotopic to a constant map, then there is an open set ⊂Sn+1 such that rank\, df=n on and f() is dense in Sn, while for any n≥ 4, there is a map f∈ C1(Sn+1,Sn) that is not homotopic to a constant map and such that rank\, df<n everywhere. The result in the case n≥ 4 answers a question of Larry Guth.
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