BPHZ renormalisation and vanishing subcriticality asymptotics of the fractional $\Phi^3_d$ model - Modelisation Systemes Langages
Article Dans Une Revue Stochastics and Partial Differential Equations: Analysis and Computations Année : 2024

BPHZ renormalisation and vanishing subcriticality asymptotics of the fractional $\Phi^3_d$ model

Résumé

We consider stochastic PDEs on the $d$-dimensional torus with fractional Laplacian of parameter $\rho\in(0,2]$, quadratic nonlinearity and driven by space-time white noise. These equations are known to be locally subcritical, and thus amenable to the theory of regularity structures, if and only if $\rho > d/3$. Using a series of recent results by the second named author, A. Chandra, I. Chevyrev, M. Hairer and L. Zambotti, we obtain precise asymptotics on the renormalisation counterterms as the mollification parameter $\varepsilon$ becomes small and $\rho$ approaches its critical value. In particular, we show that the counterterms behave like a negative power of $\varepsilon$ if $\varepsilon$ is superexponentially small in $(\rho-d/3)$, and are otherwise of order $\log(\varepsilon^{-1})$. This work also serves as an illustration of the general theory of BPHZ renormalisation in a relatively simple situation.
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Dates et versions

hal-02199627 , version 1 (26-02-2021)
hal-02199627 , version 2 (01-05-2024)

Identifiants

Citer

Nils Berglund, Yvain Bruned. BPHZ renormalisation and vanishing subcriticality asymptotics of the fractional $\Phi^3_d$ model. Stochastics and Partial Differential Equations: Analysis and Computations, inPress, ⟨10.1007/s40072-024-00331-2⟩. ⟨hal-02199627v2⟩
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