Boundary maps for $C^*$-crossed products with R with an application to the quantum Hall effect

arxiv: math-ph/0405022 · v1 · pith:QLJXU7EDnew · submitted 2004-05-07 · 🧮 math-ph · math.MP

Boundary maps for C^*-crossed products with R with an application to the quantum Hall effect

Johannes Kellendonk , Hermann Schulz-Baldes This is my paper

classification 🧮 math-ph math.MP

keywords algebraapplicationboundarycohomologycrossedcycliceffectextension

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The boundary map in K-theory arising from the Wiener-Hopf extension of a crossed product algebra with R is the Connes-Thom isomorphism. In this article the Wiener Hopf extension is combined with the Heisenberg group algebra to provide an elementary construction of a corresponding map on higher traces (and cyclic cohomology). It then follows directly from a non-commutative Stokes theorem that this map is dual w.r.t.Connes' pairing of cyclic cohomology with K-theory. As an application, we prove equality of quantized bulk and edge conductivities for the integer quantum Hall effect described by continuous magnetic Schroedinger operators.

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Boundary maps for C^*-crossed products with R with an application to the quantum Hall effect

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