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This article is cited in 13 scientific papers (total in 13 papers)
Spaces of differential forms and maps with controlled distortion
S. K. Vodop'yanov Sobolev Institute of Mathematics, Siberian Branch of the Russian Academy of Sciences
Abstract:
We study necessary and sufficient conditions for an approximately
differentiable map $f\colon\mathbb M\to\mathbb M'$ between Riemannian
manifolds to induce a bounded transfer operator of differential forms
with respect to the norms of Lebesgue spaces. As a corollary, we see
that every homeomorphism $f\colon\mathbb M\to\mathbb M'$ of class
$\operatorname{ACL}(\mathbb M)$ whose transfer operator of differential
forms with norm in $\mathcal L_p$ is an isomorphism must necessarily
be either quasi-conformal or quasi-isometric.
We give some applications of our results to the study of the
functoriality of cohomology in Lebesgue spaces.
Keywords:
Lebesgue space of differential forms, distortion of a map, quasi-conformal mapping, cohomology of Riemannian spaces.
Received: 27.06.2008
Citation:
S. K. Vodop'yanov, “Spaces of differential forms and maps with controlled distortion”, Izv. Math., 74:4 (2010), 663–689
Linking options:
https://www.mathnet.ru/eng/im2842https://doi.org/10.1070/IM2010v074n04ABEH002502 https://www.mathnet.ru/eng/im/v74/i4/p5
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Abstract page: | 815 | Russian version PDF: | 260 | English version PDF: | 26 | References: | 80 | First page: | 38 |
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