Marco Dozzi, Ekaterina T. Kolkovska, José A. López-Mimbela, Rim Touibi
Published 2023-01-05Version 1
We study the trajectorywise blowup behavior of a semilinear partial differential equation that is driven by a mixture of multiplicative Brownian and fractional Brownian motion, modeling different types of random perturbations. The linear operator is supposed to have an eigenfunction of constant sign, and we show its influence, as well as the influence of its eigenvalue and of the other parameters of the equation, on the occurrence of a blowup in finite time of the solution. We give estimates for the probability of finite time blowup and of blowup before a given fixed time. Essential tools are the mild and weak form of an associated random partial differential equation.
Comments: To appear in Stochastics: An International Journal Of Probability And Stochastic Processes
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