The Stochastic Heat Equation with Multiplicative Lévy Noise: Existence, Moments, and Intermittency
نویسندگان
چکیده
We study the stochastic heat equation (SHE) $$\partial _t u = \frac{1}{2} \Delta + \beta \xi $$ driven by a multiplicative Lévy noise $$\xi with positive jumps and coupling constant $$\beta >0$$ , in arbitrary dimension $$d\ge 1$$ . prove existence of solutions under an optimal condition if $$d=1,2$$ close-to-optimal 3$$ Under assumption that is general enough to include stable noises, we further solution unique. By establishing tight moment bounds on multiple integrals arising chaos decomposition u, show has finite pth moments for $$p>0$$ whenever does. Finally, any derive upper lower Lyapunov exponents order p solution, which are asymptotically sharp limit as \rightarrow 0$$ One our most striking findings SHE exhibits property called strong intermittency (which implies all orders $$p>1$$ pathwise mass concentration solution), non-trivial measure, at disorder intensity $${\beta }>0$$ This behavior contrasts observed $$\mathbb {Z}^d$$ {R}^d$$ Gaussian noise, does not occur high dimensions small
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ژورنال
عنوان ژورنال: Communications in Mathematical Physics
سال: 2023
ISSN: ['0010-3616', '1432-0916']
DOI: https://doi.org/10.1007/s00220-023-04768-9