Asymptotic properties of some space-time fractional stochastic equations
Foondun, Mohammud and Nane, Erkan (2017) Asymptotic properties of some space-time fractional stochastic equations. Mathematische Zeitschrift. ISSN 1432-1823 (https://doi.org/10.1007/s00209-016-1834-3)
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Abstract
Consider non-linear time-fractional stochastic heat type equations of the following type, ∂βtut(x)=−ν(−Δ)α/2ut(x)+I1−βt[λσ(u)F⋅(t,x)] in (d+1) dimensions, where v > 0, β ε (0,1), α ε (0,2]. The operator ∂βt is the Caputo fractional derivative while -(-Δ)α/2 is the generator of an isotropic stable process and It1-β is the fractional integral operator. The forcing noise denoted by F(t,x) is a Gaussian noise. And the multiplicative non-linearity σ:R→R is assumed to be globally Lipschitz continuous. Mijena and Nane (Stochastic Process Appl 125(9):3301–3326, 2015) have introduced these time fractional SPDEs. These types of time fractional stochastic heat type equations can be used to model phenomenon with random effects with thermal memory. Under suitable conditions on the initial function, we study the asymptotic behaviour of the solution with respect to time and the parameter λ. In particular, our results are significant extensions of those in Ann Probab (to appear), Foondun and Khoshnevisan (Electron J Probab 14(21): 548–568, 2009), Mijena and Nane (2015) and Mijena and Nane (Potential Anal 44:295–312, 2016). Along the way, we prove a number of interesting properties about the deterministic counterpart of the equation.
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Item type: Article ID code: 59238 Dates: DateEvent3 January 2017Published3 January 2017Published Online30 October 2016Accepted18 May 2015SubmittedSubjects: Science > Mathematics > Probabilities. Mathematical statistics Department: Faculty of Science > Mathematics and Statistics Depositing user: Pure Administrator Date deposited: 22 Dec 2016 11:47 Last modified: 15 Dec 2024 01:23 Related URLs: URI: https://strathprints.strath.ac.uk/id/eprint/59238