Global Estimates for non-linear stochastic PDEs

ERC (European Research Council)HORIZON-ERCID: 101045082
EC Contribution
€19,482
Consortium Size
1 orgs
Start Year
2022
Summary

The project is concerned with the global behaviour of solutions to Stochastic Partial Differential Equations (SPDEs) from Mathematical Physics which arise e.g. in the description of scaling limits of interacting particle systems and in the analysis of Quantum Field Theories. The equations contain noise terms which describe random fluctuations and act on all length scales. In this situation the presence of a non-linear term can lead to divergencies. A subtle renormalisation procedure, which amounts to removing infinite terms, is needed. Over the last years the understanding of non-linear SPDEs has been revolutionised and a systematic treatment of the renormalisation procedure has been achieved. This led to a short-time well-posedness theory on compact domains for a large class of highly relevant semi-linear SPDEs. In this project, I will describe the global - both in time and over infinite domains - behaviour of solutions of some of the most prominent examples, by combining PDE techniques for the non-linear equations without noise and the improved understanding of the subtle small-scale stochastic cancellations. I have already pioneered such a programme in an important special case, the dynamic Phi-4 model. The project has three specific strands: A) Proving estimates for the stochastic quantisation equations of the Sine-Gordon and Liouville Quantum Gravity models and eventually Gauge theories, and to giving a PDE-based approach to the celebrated 1-2-3 scaling of the KPZ equation, B) giving PDE-based constructions of Phi-4 models in fractional dimension and describing phase transitions in terms of mixing properties of the dynamics, C) treating degenerate parabolic equations and exploring if systems that fail to satisfy a fundamental ""sub-criticality"" scaling assumption can still be treated using SPDE techniques.""

Consortium (1)

Project Results (13)

Source: CORDIS, the EU research results database.

Publications (12)
A priori bounds for stochastic porous media equations via regularity structures
arXive e-prints· 2025
Markus Tempelmayr, Hendrik Weber
Holley--Stroock uniqueness method for the φ42 dynamics
arXive e-prints· 2025
Roland Bauerschmidt, Benoit Dagallier, Hendrik Weber
Scaling limit of a weakly asymmetric simple exclusion process in the framework of regularity structures
arXiv e-prints· 2025
Ruojun Huang, Konstantin Matetski, Hendrik Weber
Stochastic quantization of λϕ^4_2-theory in 2-d Moyal space
arXive e-prints· 2025
Chunqiu Song, Hendrik Weber, Raimar Wulkenhaar
A priori bounds for 2-d generalised Parabolic Anderson Model
arXiv e-prints· 2024DOI
Chandra, Ajay; Feltes, Guilherme de Lima; Weber, Hendrik
A priori bounds for the dynamic fractional Φ4 model on T3 in the full subcritical regime
arXiv e-prints· 2024
Salvador Esquivel, Hendrik Weber
Lecture notes on Malliavin calculus in regularity structures
arXiv e-prints· 2024
Lucas Broux, Felix Otto, Markus Tempelmayr
Martingale-driven integrals and singular SPDEs
Probability Theory and Related Fields· 2024DOI
P. Grazieschi, K. Matetski, H. Weber
Martingale-driven integrals and singular SPDEs
arXiv e-prints· 2024DOI
Grazieschi, Paolo; Matetski, Konstantin; Weber, Hendrik
Primitive asymptotics in Φ4 vector Theory
arXive e-prints· 2024
Paul-Hermann Balduf, Johannes Thürigen
The dynamical Ising-Kac model in 3D converges to $$\Phi ^4_3$$
Probability Theory and Related Fields· 2024DOI
P. Grazieschi, K. Matetski, H. Weber
The dynamical Ising-Kac model in 3D converges to Phi4/3
arXiv e-prints· 2023
Paolo Grazieschi,  Konstantin Matetski, Hendrik Weber
Other Results (1)
Periodic Reporting for period 1 - GE4SPDE (Global Estimates for non-linear stochastic PDEs)