Global well-posedness of the dynamical sine-Gordon model up to 6π
Recent Trends in Stochastic Partial Differential Equations November 17, 2025 - November 21, 2025
Location: SLMath: Eisenbud Auditorium, Online/Virtual
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No Primary AMS MSC
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Global well-posedness of the dynamical sine-Gordon model up to 6π
I will discuss recent work which shows global well-posedness of the dynamical sine-Gordon model up to the third threshold, i.e. 6π. The key novelty in the approach is the introduction of the so-called resonant equation, whose solution is entirely deterministic and which completely captures the size of the solution to the dynamical sine-Gordon model. The probabilistic fluctuations in the dynamical sine-Gordon model are then controlled using uniform estimates for modified stochastic objects. Joint with Bjoern Bringmann.
Global well-posedness of the dynamical sine-Gordon model up to 6π
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