Derives new Hu-Meyer representations and verifies sufficient conditions for iterated Stratonovich integrals w.r.t. multidimensional Wiener process components using generalized multiple Fourier series.
Development and application of the Fourier met hod for the numerical solution of Ito stochastic differential equations
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The authors give practical implementations of order-1/2 and order-1 strong schemes for SDDEs with arbitrary fixed delays by combining linear interpolation on a fixed mesh and an augmented variable-step mesh that includes all required delay points.
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New representations of the Hu-Meyer formulas and series expansion of iterated Stratonovich stochastic integrals with respect to components of a multidimensional Wiener process
Derives new Hu-Meyer representations and verifies sufficient conditions for iterated Stratonovich integrals w.r.t. multidimensional Wiener process components using generalized multiple Fourier series.
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Implementation of Milstein Schemes for Stochastic Delay-Differential Equations with Arbitrary Fixed Delays
The authors give practical implementations of order-1/2 and order-1 strong schemes for SDDEs with arbitrary fixed delays by combining linear interpolation on a fixed mesh and an augmented variable-step mesh that includes all required delay points.
- Strong Approximation of Iterated Ito and Stratonovich Stochastic Integrals Based on Generalized Multiple Fourier Series. Application to Numerical Solution of Ito SDEs and Semilinear SPDEs