On the 1d stochastic Schr\"odinger product
Abstract
We exhibit various restrictions about the wellposedness of the Schr\''odinger product :z - ∫\0t e s ∂2\x( z\s· \s) ds where refers to the so-called linear solution of the stochastic Schr\''odinger problem. We focus more specifically on the case where satisfies equationstarting-equation-abstract ( ∂\t-∂2\x)=B, \0=0, t∈ , \ x∈ T, equation where B is a white noise in space with fractional time covariance of index H>12. As an consequence of our analysis, we obtain that if H is close to 12 (that is B is close to a space-time white noise), then it is essentially impossible to treat the stochastic NLS problem equation* ( ∂\t-∂2\x)u= |u|2+B, u\0=0, t∈ , \ x∈ T, equation* using only a first-order expansion of the solution (u=+z).
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