Establishes weak universality for reaction-diffusion SPDEs with long-range noise via convergence to long-range dynamical Phi^p model using adapted multiindex regularity structures in the subcritical regime.
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2 Pith papers cite this work. Polarity classification is still indexing.
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math.PR 2years
2026 2verdicts
UNVERDICTED 2representative citing papers
Constructs a regularity structure and model for the stochastic Langevin dynamics of 3D Euclidean Yang-Mills, defined as the limit of mollified approximations, with global stochastic and pointwise weighted Besov estimates holding almost surely.
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Weak universality for stochastic reaction-diffusion models with long-range correlated noise
Establishes weak universality for reaction-diffusion SPDEs with long-range noise via convergence to long-range dynamical Phi^p model using adapted multiindex regularity structures in the subcritical regime.
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A tree-free approach to 3D Yang-Mills Langevin dynamic. Analytic estimates and the existence of a model for a regularity structure
Constructs a regularity structure and model for the stochastic Langevin dynamics of 3D Euclidean Yang-Mills, defined as the limit of mollified approximations, with global stochastic and pointwise weighted Besov estimates holding almost surely.