Ashley Montanaro
Published 2012-08-01, updated 2012-11-13Version 3
Hypercontractive inequalities have become important tools in theoretical computer science and have recently found applications in quantum computation. In this note we discuss how hypercontractive inequalities, in various settings, can be used to obtain (fairly) concise proofs of several results in quantum information theory: a recent lower bound of Lancien and Winter on the bias achievable by local measurements which are 4-designs; spectral concentration bounds for k-local Hamiltonians; and a recent result of Pellegrino and Seoane-Sepulveda giving general lower bounds on the classical bias obtainable in multiplayer XOR games.
Comments: 18 pages; v3: historical and typo fixes and additional remarks
Journal: Journal of Mathematical Physics, vol. 53, 122206 (2012)
Quantum Information Theory and Applications to Quantum Cryptography
Entanglement in Graph States and its Applications
Yangian and Applications
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