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Physical Resurgent Extrapolation

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arxiv 2003.07451 v1 pith:N4GDMTJQ submitted 2020-03-16 hep-th cond-mat.othermath-phmath.MP

Physical Resurgent Extrapolation

classification hep-th cond-mat.othermath-phmath.MP
keywords physicalextrapolationresurgentasymptoticsbecausecausticsconfigurationscontrolled
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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Expansions of physical functions are controlled by their singularities, which have special structure because they themselves are physical, corresponding to instantons, caustics or saddle configurations. Resurgent asymptotics formalizes this idea mathematically, and leads to significantly more powerful extrapolation methods to extract physical information from a finite number of terms of an expansion, including precise decoding of non-perturbative effects.

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Cited by 3 Pith papers

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  3. Introductory Lectures on Resurgence: CERN Summer School 2024

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    Introductory lectures cover resurgent asymptotics using examples like the Airy function, nonlinear Stokes phenomenon, Heisenberg-Euler action, and resurgent continuation.