arXiv:2303.18192 Abstract | arXiv Analytics

arXiv:2303.18192 [math.PR]Abstract References Reviews Resources

Characterizing models in regularity structures: a quasilinear case

Published 2023-03-31Version 1

We give a novel characterization of the centered model in regularity structures which persists for rough drivers even as a mollification fades away. We present our result for a class of quasilinear equations driven by noise, however we believe that the method is robust and applies to a much broader class of subcritical equations. Furthermore, we prove that a convergent sequence of noise ensembles, satisfying uniformly a spectral gap assumption, implies the corresponding convergence of the associated models. Combined with the characterization, this establishes a universality-type result.

Categories: math.PR, math.AP

Subjects: 60H17, 60L30, 60H07

Keywords: regularity structures, quasilinear case, characterizing models, quasilinear equations driven, mollification fades away

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