Hyperbolic SPDEs-analytical and numerical study using Wiener chaos approach
Abstract
In the first part of this dissertation we propose a constructive approach for generalized weighted Wiener Chaos solutions of linear hyperbolic SPDEs driven by a cylindrical Brownian Motion. Explicit conditions for the existence, uniqueness and regularity of generalized (Wiener Chaos) solutions are established in Sobolev spaces. An equivalence relation between the Wiener Chaos solution and the traditional one is established. In the second part we propose a novel numerical scheme based on the Wiener Chaos expansion for solving hyperbolic stochastic PDEs. Through the Wiener Chaos expansion the stochastic PDE is reduced to an infinite hierarchy of deterministic PDEs which is then truncated to a finite system of PDEs, that can be addressed by standard techniques. A priori and a posteriori convergence results for the method are provided. The proposed method is applied to solve the stochastic forward rate Heath-Jarrow-Morton model with the Musiela parametrization and the results are compared ...
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