Asymptotics in Dynamics, Geometry and PDEs; Generalized by Christian Bogner, Stefan Weinzierl (auth.), Ovidiu Costin,

By Christian Bogner, Stefan Weinzierl (auth.), Ovidiu Costin, Frédéric Fauvet, Frédéric Menous, David Sauzin (eds.)

These are the lawsuits of a one-week foreign convention headquartered on asymptotic research and its functions. They include significant contributions facing: mathematical physics: PT symmetry, perturbative quantum box concept, WKB research, neighborhood dynamics: parabolic structures, small denominator questions, new facets in mildew calculus, with comparable combinatorial Hopf algebras and alertness to multizeta values, a brand new kin of resurgent features on the topic of knot theory.

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Additional info for Asymptotics in Dynamics, Geometry and PDEs; Generalized Borel Summation vol. II

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5 The basis lama• /lami• . . . . . . . . 6 The basis loma• /lomi• . . . . . . . 7 The basis luma• /lumi• . . . . . . . 8 Arithmetical vs analytic smoothness . . . . 9 Singulator kernels and “wandering” bialternals . A conjectural basis for ALAL ⊂ ARI al/al . The three series of bialternals . . . . . . . . 1 Basic bialternals: the enumeration problem . . 2 The regular bialternals: ekma, doma . . . . 3 The irregular bialternals: carma . . . . . 4 Main differences between regular and irregular bialternals .

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