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Holographic chaos, pole-skipping, and regularity

Makoto Natsuume, Takashi Okamura

2020Institutional Repositories DataBase (IRDB)39 citations

Abstract

Abstract We investigate the “pole-skipping” phenomenon in holographic chaos. According to pole-skipping, the energy-density Green’s function is not unique at a special point in the complex momentum plane. This arises because the bulk field equation has two regular near-horizon solutions at the special point. We study the regularity of the two solutions more carefully using curvature invariants. In the upper-half $\omega$-plane, one solution, which is normally interpreted as the outgoing mode, is in general singular at the future horizon and produces a curvature singularity. However, at the special point, both solutions are indeed regular. Moreover, the incoming mode cannot be uniquely defined at the special point due to these solutions.

Topics & Concepts

PhysicsSingularityCurvatureHorizonPlane (geometry)Classical mechanicsMomentum (technical analysis)Singular point of a curveMathematical physicsMathematical analysisGeometryMathematicsEconomicsAstronomyFinanceBlack Holes and Theoretical PhysicsCosmology and Gravitation TheoriesQuantum Electrodynamics and Casimir Effect
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