Almost sure boundedness of iterates for derivative nonlinear wave equations
Abstract
We study nonlinear wave equations on R2+1 with quadratic derivative nonlinearities, which include in particular nonlinearities exhibiting a null form structure, with random initial data in Hx1× L2x. In contrast to the counterexamples of Zhou Zhou and Foschi-Klainerman FK, we obtain a uniform time interval I on which the Picard iterates of all orders are almost surely bounded in Ct(I ; Hx1).
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