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.
A comparative analysis of efficiency of using the Legendre polynomials and trigonometric functions for the numerical solution of Ito stoc hastic differential equa- tions
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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