9 - Topological entanglement entropy
from Part III - Quantum information perspectives
Published online by Cambridge University Press: 05 August 2012
Summary
To perform topological quantum computation we first need to experimentally realise anyons in a topological system. These systems are characterised by intriguing non-local quantum correlations that give rise to the anyonic statistics. What are the diagnostic tools we have to identify if a given system is indeed topological or not? Different phases of matter are characterised by their symmetries. This information is captured by order parameters. Usually, order parameters are defined in terms of local operators that can be measured in the laboratory. For example, the magnetisation of a spin system is given as the expectation value of a single spin with respect to the ground state. Such local properties can describe fascinating physical phenomena efficiently, such as ferromagnetism, and can pinpoint quantum phase transitions.
But what about topological systems? Experimentally, we usually identify the topological character of systems, such as the fractional quantum Hall liquids, by probing the anyonic properties of their excitations (Miller et al., 2007). However, topological order should be a characteristic of the ground state (Thouless et al., 1982; Wen, 1995). The natural question arises: is it possible to identify a property of the ground state of a system that implies anyonic excitations? The theoretical background that made it possible to answer this question came from entropic considerations of simple topological models. Hamma et al. (2005) studied the entanglement entropy of the toric code ground state and noticed an unusual behaviour.
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- Introduction to Topological Quantum Computation , pp. 177 - 192Publisher: Cambridge University PressPrint publication year: 2012