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Open Quantum Systems Decoherence Quantum Simulation Quantum Foundations

Relation between large dimension operators and oscillator algebra of Young diagrams

arXiv
Authors: Hai Lin

Year

2014

Paper ID

48350

Status

Preprint

Abstract Read

~2 min

Abstract Words

125

Citations

N/A

Abstract

The operators with large scaling dimensions can be labelled by Young diagrams. Among other bases, the operators using restricted Schur polynomials have been known to have a large N but nonplanar limit under which they map to states of a system of harmonic oscillators. We analyze the oscillator algebra acting on pairs of long rows or long columns in the Young diagrams of the operators. The oscillator algebra can be reached by a Inonu-Wigner contraction of the u(2) algebra inside of the u(p) algebra of p giant gravitons. We present evidences that integrability in this case can persist at higher loops due to the presence of the oscillator algebra which is expected to be robust under loop corrections in the nonplanar large N limit.

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  • This paper contributes to the Quantum Simulation research area in the Quantum Articles archive.
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  • The operators with large scaling dimensions can be labelled by Young diagrams.

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