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Index theory of the de Rham complex on manifolds with periodic ends
Journal article   Open access   Peer reviewed

Index theory of the de Rham complex on manifolds with periodic ends

Tomasz Mrowka, Daniel Ruberman and Nikolai Saveliev
Algebraic & geometric topology, Vol.14(6), pp.3689-3700
10/15/2013

Abstract

Algebr. Geom. Topol. 14 (2014) 3689-3700 We study the de Rham complex on a smooth manifold with a periodic end modeled on an infinite cyclic cover X' \to X. The completion of this complex in exponentially weighted L^2-norms is Fredholm for all but finitely many exceptional weights determined by the eigenvalues of the covering translation map H_*(X') \to H_*(X'). We calculate the index of this weighted de Rham complex for all weights away from the exceptional ones.
url
https://doi.org/10.2140/agt.2014.14.3689View
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