On the effect of randomization on supercritical heat equations
Abstract
Recently, in glogic2025non, it has been shown that the focusing power nonlinearity heat equation equationEq:HeatabstractNLH ∂t u - u = |u|p-1u, p>1, equation in dimensions d ≥ 3 has non-unique local solutions in Lq(Rd) for q < d(p-1)/2 provided that p < pJL, where pJL denotes the Joseph-Lundgren exponent. In this paper we investigate the effect of different randomizations on the well-posedness of the equation. First we show that adding a forcing term white in time and colored in space in Eq:Heatabstract is not sufficient to improve the solution theory: namely, we prove non-uniqueness for local-in-time mild solutions of Eq:Heatabstract with additive noise. Second, we discuss how randomizing the initial conditions of Eq:Heatabstract affects its well-posedness.
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