Hyperbolic Anderson model 2: Strichartz estimates and Stratonovich setting
classification
🧮 math.PR
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strichartzequationestimatesgaussiannoisesomestratonovichwave
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We study a wave equation in dimension $d\in \{1,2\}$ with a multiplicative space-time Gaussian noise. The existence and uniqueness of the Stratonovich solution is obtained under some conditions imposed on the Gaussian noise. The strategy is to develop some Strichartz type estimates for the wave kernel in weighted Besov spaces, by which we can prove the wellposedness of an associated Young-type equation. Those Strichartz bounds are of independent interest.
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