A linear numerical scheme for nonlinear BSDEs with uniformly continuous coefficients.

Fard, Omid S.; Kamyad, Ali V.

Displaying similar documents to “A linear numerical scheme for nonlinear BSDEs with uniformly continuous coefficients.”

A general stochastic maximum principle for singular control problems.

Bahlali, Seid, Mezerdi, Brahim (2005)

Electronic Journal of Probability [electronic only]

Similarity:

A general analytical result for non-linear SPDE's and applications.

Denis, Laurent, Stoica, L. (2004)

Electronic Journal of Probability [electronic only]

Similarity:

Stochastic FitzHugh-Nagumo equations on networks with impulsive noise.

Bonaccorsi, Stefano, Marinelli, Carlo, Ziglio, Giacomo (2008)

Electronic Journal of Probability [electronic only]

Similarity:

On some recent aspects of stochastic control and their applications.

Pham, Huyên (2005)

Probability Surveys [electronic only]

Similarity:

Quantitative results for perturbed stochastic differential equations.

Stoyanov, Jordan, Botev, Dobrin (1996)

Journal of Applied Mathematics and Stochastic Analysis

Similarity:

On a class of forward-backward stochastic differential systems in infinite dimensions.

Guatteri, Giuseppina (2007)

Journal of Applied Mathematics and Stochastic Analysis

Similarity:

Classical and variational differentiability of BSDEs with quadratic growth.

Ankirchner, Stefan, Imkeller, Peter, Dos Reis, Gonçalo J.N. (2007)

Electronic Journal of Probability [electronic only]

Similarity:

Backward doubly stochastic differential equations with infinite time horizon

Bo Zhu, Baoyan Han (2012)

Applications of Mathematics

Similarity:

We give a sufficient condition on the coefficients of a class of infinite horizon backward doubly stochastic differential equations (BDSDES), under which the infinite horizon BDSDES have a unique solution for any given square integrable terminal values. We also show continuous dependence theorem and convergence theorem for this kind of equations.

Weak solutions to stochastic differential equations driven by fractional Brownian motion

J. Šnupárková (2009)

Czechoslovak Mathematical Journal

Similarity:

Existence of a weak solution to the $n$ -dimensional system of stochastic differential equations driven by a fractional Brownian motion with the Hurst parameter $H \in (0, 1) ∖ {\frac{1}{2}}$ is shown for a time-dependent but state-independent diffusion and a drift that may by split into a regular part and a singular one which, however, satisfies the hypotheses of the Girsanov Theorem. In particular, a stochastic nonlinear oscillator driven by a fractional noise is considered.