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Integrated density of states for ergodic random Schrödinger operators on manifolds.

Peyerimhoff, N. and Veselić, I. (2002) 'Integrated density of states for ergodic random Schrödinger operators on manifolds.', Geometriae dedicata., 91 (1). pp. 117-135.


We consider the Riemannian universal covering of a compact manifold M = X/Γ and assume that Γ is amenable. We show the existence of a (nonrandom) integrated density of states for an ergodic random family of Schrödinger operators on X.

Item Type:Article
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Publisher statement:Reprinted from Geometriae dedicata, 91(1), 2002, 117-135, with permission of Kluwer Law International.
Date accepted:No date available
Date deposited:07 June 2016
Date of first online publication:April 2002
Date first made open access:No date available

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