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| Funder | European Commission |
|---|---|
| Recipient Organization | Technische Universitaet Wien |
| Country | Austria |
| Start Date | Mar 01, 2024 |
| End Date | Feb 28, 2029 |
| Duration | 1,825 days |
| Number of Grantees | 1 |
| Roles | Coordinator |
| Data Source | European Commission |
| Grant ID | 101117125 |
The field of stochastic partial differential equations (SPDEs) has been revolutionised in the last decade by breakthrough works of Hairer, Gubinelli-Imkeller-Perkowski, and many others.
A new understanding of renormalised solution theories emerged, solving long-standing singular equations arising in various areas of probability and mathematical physics.
The purpose of this project is to study a number of important questions in the field, open new directions, and challenge central open problems:(i) Launch the investigation of singular SPDEs that preserve Gibbs measures of distributional Hamiltonians such as the density of self-repellent polymers;(ii) Tackle the question of a quasilinear renormalisation formula, the last remaining component of the quasilinear solution theory;(iii) Develop an efficient quantitative approximation theory of singular SPDEs, removing the criticality barrier from the rate of convergence.
Technische Universitaet Wien
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