Tristan Robert scite author profile

We study the two-dimensional stochastic sine-Gordon equation (SSG) in the hyperbolic setting. In particular, by introducing a suitable time-dependent renormalization for the relevant imaginary multiplicative Gaussian chaos, we prove local wellposedness of SSG for any value of a parameter β 2 > 0 in the nonlinearity. This exhibits sharp contrast with the parabolic case studied by Hairer and Shen (2016) and Chandra, Hairer, and Shen (2018), where the parameter is restricted to the subcritical range: 0 < β 2 < 8π. We also present a triviality result for the unrenormalized SSG.2010 Mathematics Subject Classification. 35L71, 60H15.

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Invariant Gibbs dynamics for the dynamical sine-Gordon model

Oh¹,

Robert

Sosoe³

et al. 2020

Proceedings of the Royal Society of Edinburgh: Section A Mathem

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In this note, we study the hyperbolic stochastic damped sine-Gordon equation (SdSG), with a parameter β2 > 0, and its associated Gibbs dynamics on the two-dimensional torus. After introducing a suitable renormalization, we first construct the Gibbs measure in the range 0 < β2 < 4π via the variational approach due to Barashkov-Gubinelli (2018). We then prove almost sure global well-posedness and invariance of the Gibbs measure under the hyperbolic SdSG dynamics in the range 0 < β2 < 2π. Our construction of the Gibbs measure also yields almost sure global well-posedness and invariance of the Gibbs measure for the parabolic sine-Gordon model in the range 0 < β2 < 4π.

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Tristan Robert

Newton's Problem of the Body of Minimal Resistance in the Class of Convex Developable Functions

On the two-dimensional hyperbolic stochastic sine-Gordon equation

Invariant Gibbs dynamics for the dynamical sine-Gordon model

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