We study multiscale integrator numerical schemes for a class of stiff stochastic differential equations (SDEs). We consider multiscale SDEs that behave as diffusions on graphs as the stiffness parameter goes to its limit. Classical numerical discretization schemes, such as the Euler-Maruyama scheme, become unstable as the stiffness parameter converges to its limit and appropriate multiscale integrators can correct for this. We rigorously establish the convergence of the numerical method to the related diffusion on graph, identifying the appropriate choice of discretization parameters. Theoretical results are supplemented by numerical studies on the problem of the recently developing area of introducing irreversibility in Langevin samplers i...
The discretization of the stationary diffusion equation with random parameters by the Stochastic Fin...
We study a class of numerical methods for a system of second-order SDE driven by a linear fast force...
We analyze the convergence and complexity of multi-level Monte Carlo (MLMC) discretizations of a cla...
The aim of the work presented in this thesis is the construction and the study of numerical integrat...
We study a family of numerical schemes applied to a class of multiscale systems of stochastic differ...
Many real life problems have multiple spatial scales. In addition to the multiscale nature one has t...
We considered strong convergent stochastic schemes for the simulation of stochastic differential equ...
We develop a framework that allows the use of the multi-level Monte Carlo (MLMC) methodology (Giles2...
We study a family of numerical schemes applied to a class of multiscale systems of stochastic differ...
We introduce new sufficient conditions for a numerical method to approximate with high order of accu...
We introduce new sufficient conditions for a numerical method to approximate with high order of accu...
A new explicit stabilized scheme of weak order one for stiff and ergodic stochastic differential equ...
Abstract. In this paper, we present a class of explicit numerical methods for stiff Ito ̂ stochastic...
We introduce a new methodology based on the multirevolution idea for constructing integrators for st...
We present a new class of integrators for stiff PDEs. These integrators are generalizations of FLow ...
The discretization of the stationary diffusion equation with random parameters by the Stochastic Fin...
We study a class of numerical methods for a system of second-order SDE driven by a linear fast force...
We analyze the convergence and complexity of multi-level Monte Carlo (MLMC) discretizations of a cla...
The aim of the work presented in this thesis is the construction and the study of numerical integrat...
We study a family of numerical schemes applied to a class of multiscale systems of stochastic differ...
Many real life problems have multiple spatial scales. In addition to the multiscale nature one has t...
We considered strong convergent stochastic schemes for the simulation of stochastic differential equ...
We develop a framework that allows the use of the multi-level Monte Carlo (MLMC) methodology (Giles2...
We study a family of numerical schemes applied to a class of multiscale systems of stochastic differ...
We introduce new sufficient conditions for a numerical method to approximate with high order of accu...
We introduce new sufficient conditions for a numerical method to approximate with high order of accu...
A new explicit stabilized scheme of weak order one for stiff and ergodic stochastic differential equ...
Abstract. In this paper, we present a class of explicit numerical methods for stiff Ito ̂ stochastic...
We introduce a new methodology based on the multirevolution idea for constructing integrators for st...
We present a new class of integrators for stiff PDEs. These integrators are generalizations of FLow ...
The discretization of the stationary diffusion equation with random parameters by the Stochastic Fin...
We study a class of numerical methods for a system of second-order SDE driven by a linear fast force...
We analyze the convergence and complexity of multi-level Monte Carlo (MLMC) discretizations of a cla...