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Homotopy groups of spheres and Lipschitz homotopy groups of Heisenberg groups

Published 21 Jan 2013 in math.GT and math.FA | (1301.4978v3)

Abstract: We provide a sufficient condition for the nontriviality of the Lipschitz homotopy group of the Heisenberg group, $\pi_m{Lip}(H_n)$, in terms of properties of the classical homotopy group of the sphere, $\pi_m(Sn)$. As an application we provide a new simplified proof of the fact that $\pi_n{Lip}(H_n)\neq 0$, $n=1,2,...$, and we prove a new result that $\pi_{4n-1}{Lip}(H_{2n})\neq 0$ for $n=1,2,...$ The last result is based on a new generalization of the Hopf invariant. We also prove that Lipschitz mappings are not dense in the Sobolev space $W{1,p}(M,H_{2n})$ when $dim M\geq 4n$ and $4n-1\leq p<4n$.

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