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Lorentzian Dynamics and Factorization Beyond Rationality

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arxiv 2012.01429 v4 pith:USNM4VBA submitted 2020-12-02 hep-th cond-mat.str-el

Lorentzian Dynamics and Factorization Beyond Rationality

classification hep-th cond-mat.str-el
keywords defecttopologicallinesoperatorconformalfactorizationlocaltheory
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We investigate the emergence of topological defect lines in the conformal Regge limit of two-dimensional conformal field theory. We explain how a local operator can be factorized into a holomorphic and an anti-holomorphic defect operator connected through a topological defect line, and discuss implications on Lorentzian dynamics including aspects of chaos. We derive a formula relating the infinite boost limit, which holographically encodes the "opacity" of bulk scattering, to the action of topological defect lines on local operators. Leveraging the unitary bound on the opacity and the positivity of fusion coefficients, we show that the spectral radii of a large class of topological defect lines are given by their loop expectation values. Factorization also gives a formula relating the local and defect operator algebras, and fusion categorical data. We then review factorization in rational conformal field theory from a defect perspective, and examine irrational theories. On the orbifold branch of the $c = 1$ free boson theory, we find a unified description for the topological defect lines through which the twist fields are factorized; at irrational points, the twist fields factorize through "non-compact" topological defect lines which exhibit continuous defect operator spectra. Along the way, we initiate the development of a formalism to characterize non-compact topological defect lines.

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