Lluís Quer-Sardanyons scite author profile

We present the Walsh theory of stochastic integrals with respect to martingale measures, alongside of the Da Prato and Zabczyk theory of stochastic integrals with respect to Hilbert-space-valued Wiener processes and some other approaches to stochastic integration, and we explore the links between these theories. We then show how each theory can be used to study stochastic partial differential equations, with an emphasis on the stochastic heat and wave equations driven by spatially homogeneous Gaussian noise that is white in time. We compare the solutions produced by the different theories.

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Existence and Smoothness of the Density for Spatially Homogeneous SPDEs

Nualart

Quer-Sardanyons

2007

Potential Anal

107

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In this paper, we extend Walsh's stochastic integral with respect to a Gaussian noise, white in time and with some homogeneous spatial correlation, in order to be able to integrate some random measure-valued processes. This extension turns out to be equivalent to Dalang's one. Then we study existence and regularity of the density of the probability law for the real-valued mild solution to a general second order stochastic partial differential equation driven by such a noise. For this, we apply the techniques of the Malliavin calculus. Our results apply to the case of the stochastic heat equation in any space dimension and the stochastic wave equation in space dimension d = 1, 2, 3. Moreover, for these particular examples, known results in the literature have been improved.

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SPDEs with affine multiplicative fractional noise in space with index $\frac{1}{4}\langle H\langle\frac{1}{2}$

Balan

María

Quer-Sardanyons

2015

Electron. J. Probab.

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Absolute continuity of the law of the solution to the 3-dimensional stochastic wave equation

Quer-Sardanyons

Sanz–Solé

2004

Journal of Functional Analysis

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