L\'{e}vy driven CARMA generalized processes and stochastic partial differential equations
classification
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carmadifferentialdrivengeneralizedgivepartialrandomsolution
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We give a new definition of a L\'{e}vy driven CARMA random field, defining it as a generalized solution of a stochastic partial differential equation (SPDE). Furthermore, we give sufficient conditions for the existence of a mild solution of our SPDE. Our model finds a connection between all known definitions of CARMA random fields, and especially for dimension 1 we obtain the classical CARMA process.
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L\'{e}vy driven linear and semilinear stochastic partial differential equations
Proves that Lévy-driven linear equations p(D)s = q(D)ḊL admit measurable solutions in Besov spaces and that semilinear versions p(D)u = g(·,u) + ḊL have measurable solutions in weighted Besov spaces when g is Lipschitz.
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