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Quenched asymptotics for a 1-d stochastic heat equation driven by a rough spatial noise

Published 9 Oct 2018 in math.PR | (1810.04212v1)

Abstract: In this note we consider the parabolic Anderson model in one dimension with time-independent fractional noise $\dot{W}$ in space. We consider the case $H<\frac{1}{2}$ and get existence and uniqueness of solution. In order to find the quenched asymptotics for the solution we consider its Feynman-Kac representation and explore the asymptotics of the principal eigenvalue for a random operator of the form $\frac{1}{2} \Delta + \dot{W}$.

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