Quantitative nullhomotopy and the Hopf Invariant

Abstract

Let G: S4n-1 → S2n be a map with nonzero Hopf Invariant. Using the generalized Hopf invariant introduced by Hajasz, Schikorra and Tyson, we show that any null-homotopy F: B4n → B2n+1 of G with small (2n+1)-dilation must have large (2n)-dilation. Conversely, we show that these results are sharp by constructing smooth null-homotopies with arbitrarily small (2n+1)-dilation.

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