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arxiv: 1604.02337 · v3 · pith:AMONL23Anew · submitted 2016-04-08 · 🧮 math-ph · math.KT· math.MP· math.OA

The K-theoretic bulk-edge correspondence for topological insulators

Chris Bourne , Johannes Kellendonk , Adam Rennie This is my paper
classification 🧮 math-ph math.KTmath.MPmath.OA
keywords kasparovtopologicalalgebrasbulkbulk-edgecorrespondencecrossededge
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We study the application of Kasparov theory to topological insulator systems and the bulk-edge correspondence. We consider observable algebras as modelled by crossed products, where bulk and edge systems may be linked by a short exact sequence. We construct unbounded Kasparov modules encoding the dynamics of the crossed product. We then link bulk and edge Kasparov modules using the Kasparov product. Because of the anti-linear symmetries that occur in topological insulator models, real $C^*$-algebras and $KKO$-theory must be used.

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