Add to ORKGThe fair price for an American option where the underlying asset follows a jump diffusion process can be formulated as a partial integral differential linear complementarity problem. We develop an implicit discretization method for pricing such American options. The jump diffusion correlation integral term is computed using an iterative method coupled with an FFT while the American constraint is imposed by using a penalty method. We derive sufficient conditions for global convergence of the discrete penalized equations at each timestep. Finally, we present numerical tests which illustrate such convergence
This paper is devoted to develop a robust numerical method to solve a system of complementarity prob...
AbstractWe derive and analyze a penalty method for solving American multi-asset option problems. A s...
This paper is devoted to study the convergence analysis of a monotonic penalty method for pricing Am...
(Communicated by David Gao) Abstract. This paper is devoted to develop a power penalty method for pr...
We propose an iterative method for pricing American options under jump-diffusion models. A finite di...
In this paper we develop a numerical method for a nonlinear partial integro-differential complementa...
Abstract We consider the numerical pricing of American options under the Bates model which adds log-...
Numerical methods are developed for pricing European and American options under Kou’s jump-diffusion...
We propose an implicit numerical method for pricing American options where the underlying asset foll...
We approximate the price of the American put for jump diffusions by a sequence of functions, which a...
We approximate the price of the American put for jump diffusions by a sequence of functions, which a...
This paper is devoted to studying the numerical performance of a power penalty method for a linear p...
We present a stable finite difference scheme on a piecewise uniform mesh along with a penalty method...
Abstract. This article combines various methods of analysis to draw a comprehensive picture of penal...
AbstractIn this paper, an effectively computable approximation of the price of an American option in...
This paper is devoted to develop a robust numerical method to solve a system of complementarity prob...
AbstractWe derive and analyze a penalty method for solving American multi-asset option problems. A s...
This paper is devoted to study the convergence analysis of a monotonic penalty method for pricing Am...
(Communicated by David Gao) Abstract. This paper is devoted to develop a power penalty method for pr...
We propose an iterative method for pricing American options under jump-diffusion models. A finite di...
In this paper we develop a numerical method for a nonlinear partial integro-differential complementa...
Abstract We consider the numerical pricing of American options under the Bates model which adds log-...
Numerical methods are developed for pricing European and American options under Kou’s jump-diffusion...
We propose an implicit numerical method for pricing American options where the underlying asset foll...
We approximate the price of the American put for jump diffusions by a sequence of functions, which a...
We approximate the price of the American put for jump diffusions by a sequence of functions, which a...
This paper is devoted to studying the numerical performance of a power penalty method for a linear p...
We present a stable finite difference scheme on a piecewise uniform mesh along with a penalty method...
Abstract. This article combines various methods of analysis to draw a comprehensive picture of penal...
AbstractIn this paper, an effectively computable approximation of the price of an American option in...
This paper is devoted to develop a robust numerical method to solve a system of complementarity prob...
AbstractWe derive and analyze a penalty method for solving American multi-asset option problems. A s...
This paper is devoted to study the convergence analysis of a monotonic penalty method for pricing Am...