We construct a finite element like scheme for fully nonlinear integro-partial differential equations arising in optimal control of jump-processes. Special cases of these equations include optimal portfolio and option pricing equations in finance. The schemes are monotone and robust. We prove that they converge in very general situations, including degenerate equations, multiple dimensions, relatively low regularity of the data, and for most (if not all) types of jump-models used in finance. In all cases we provide (probably optimal) error bounds. These bounds apply when grids are unstructured and integral terms are very singular, two features that are new or highly unusual in this setting
We study the obstacle problem for a class of nonlinear integro-partial differential equations of sec...
We derive error estimates for finite difference-quadrature schemes approximating viscosity solutions...
We analyze the discretization of non-local degenerate integrodifferential equations arising as so-ca...
Abstract. We construct a finite element like scheme for fully non-linear integro-partial differ-enti...
The main purpose of this thesis is to study a singular finite-horizon portfolio optimization problem...
This thesis considers classical methods to solve stochastic control problems and valuation problems ...
(Communicated by the associate editor name) Abstract. We consider the numerical solution of Hamilton...
We present a stable finite difference scheme on a piecewise uniform mesh along with a penalty method...
Abstract. We present a finite difference method for solving parabolic partial integro-differential e...
Banas L, Dawid H, Randrianasolo TA, Storn J, Wen X. Numerical approximation of a system of Hamilton-...
International audienceWe present a finite difference method for solving parabolic partial integro-di...
International audienceIn a previous work, we introduced a lower complexity probabilistic max-plus nu...
We derive error estimates for approximate (viscosity) solutions of Bellman equations associated to c...
In this note we study the convergence of monotone P1 finite element methods on unstructured meshes f...
We derive error estimates for approximate (viscosity) solutions of Bellman equations associated to c...
We study the obstacle problem for a class of nonlinear integro-partial differential equations of sec...
We derive error estimates for finite difference-quadrature schemes approximating viscosity solutions...
We analyze the discretization of non-local degenerate integrodifferential equations arising as so-ca...
Abstract. We construct a finite element like scheme for fully non-linear integro-partial differ-enti...
The main purpose of this thesis is to study a singular finite-horizon portfolio optimization problem...
This thesis considers classical methods to solve stochastic control problems and valuation problems ...
(Communicated by the associate editor name) Abstract. We consider the numerical solution of Hamilton...
We present a stable finite difference scheme on a piecewise uniform mesh along with a penalty method...
Abstract. We present a finite difference method for solving parabolic partial integro-differential e...
Banas L, Dawid H, Randrianasolo TA, Storn J, Wen X. Numerical approximation of a system of Hamilton-...
International audienceWe present a finite difference method for solving parabolic partial integro-di...
International audienceIn a previous work, we introduced a lower complexity probabilistic max-plus nu...
We derive error estimates for approximate (viscosity) solutions of Bellman equations associated to c...
In this note we study the convergence of monotone P1 finite element methods on unstructured meshes f...
We derive error estimates for approximate (viscosity) solutions of Bellman equations associated to c...
We study the obstacle problem for a class of nonlinear integro-partial differential equations of sec...
We derive error estimates for finite difference-quadrature schemes approximating viscosity solutions...
We analyze the discretization of non-local degenerate integrodifferential equations arising as so-ca...