Consider the following equation ∂tut(x) = 1 2 ∂xxut(x) + λσ(ut(x))W˙ (t, x) on an interval. Under Dirichlet boundary condition, we show that in the long run, the second moment of the solution grows exponentially fast if λ is large enough. But if λ is small, then the second moment eventually decays exponentially. If we replace the Dirichlet boundary condition by the Neumann one, then the second moment grows exponentially fast no matter what λ is. We also provide various extensions.Research supported in part by the European Union programme FP7-PEOPLE-2012-CIG under grant agreement 333938
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AbstractIn this paper, relations between the asymptotic behavior for a stochastic wave equation and ...
We study a finite system of diffusions on the half-line, absorbed when they hit zero, with a correla...
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AbstractIn this paper a boundary value problem for the heat equation with solution-dependent boundar...
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Consider the semilinear heat equation ∂tu = ∂2xu + λσ(u)ξ on the interval [0, 1] with Dirichlet zero...
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