The Stiefel--Whitney theory of topological insulators

Ralph M. Kaufmann; Dan Li; Birgit Wehefritz-Kaufmann

arXiv:1604.02792·math-ph·April 12, 2016·5 cites

The Stiefel--Whitney theory of topological insulators

Ralph M. Kaufmann, Dan Li, Birgit Wehefritz-Kaufmann

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TL;DR

This paper interprets the topological $\

Contribution

It introduces a Stiefel--Whitney class framework to understand the $\

Findings

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Topological $\

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Topological $\

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The $\

Abstract

We study the topological band theory of time reversal invariant topological insulators and interpret the topological $Z_{2}$ invariant as an obstruction in terms of Stiefel--Whitney classes. The band structure of a topological insulator defines a Pfaffian line bundle over the momentum space, whose structure group can be reduced to $Z_{2}$ . So the topological $Z_{2}$ invariant will be understood by the Stiefel--Whitney theory, which detects the orientability of a principal $Z_{2}$ -bundle. Moreover, the relation between weak and strong topological insulators will be understood based on cobordism theory. Finally, the topological $Z_{2}$ invariant gives rise to a fully extended topological quantum field theory (TQFT).

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Taxonomy

TopicsTopological Materials and Phenomena · Quantum many-body systems · Advanced Condensed Matter Physics