In this paper we develop a numerical approach to a fractional-order differential Linear Complementarity Problem (LCP) arising in pricing European and American options under a geometric Lévy process. The LCP is first approximated by a nonlinear penalty fractional Black-Scholes (fBS) equation. We then propose a finite difference scheme for the penalty fBS equation. We show that both the continuous and the discretized fBS equations are uniquely solvable and establish the convergence of the numerical solution to the viscosity solution of the penalty fBS equation by proving the consistency, stability and monotonicity of the numerical scheme. We also show that the discretization has the 2nd-order truncation error in both the spatial and time mesh...
The thesis on option pricing by finite difference methods focuses on the numerical methods used to p...
2000 Mathematics Subject Classification: 65M06, 65M12.The paper is devoted to pricing options charac...
Numerical methods are developed for pricing European and American options under Kou’s jump-diffusion...
In this paper we develop a numerical approach to a fractional-order differential linear complementar...
This work deals with the put option pricing problems based on the time-fractional Black-Scholes equa...
© 2017 Elsevier Inc.In this paper we propose a power penalty method for a linear complementarity pro...
In this paper a time-fractional Black-Scholes model (TFBSM) is considered to study the price change ...
In this work, we have derived an approximate solution of the fractional Black-Scholes models using a...
We study the Black-Scholes model for American options with dividends. We cast the problem as a free-...
We study the Black-Scholes model for American options with dividends. We cast the problem as a free-...
Many American option pricing models can be formulated as linear complementarity problems (LCPs) invo...
[EN] In this paper finite difference methods for pricing American option with rationality parameter ...
2020 Elsevier B.V. In this paper, we investigate the European option pricing problem under a regime ...
The Black-Scholes model is commonly used to track the price of European options with respect to matu...
Accurate and efficient numerical solutions have been described for a selection of financial options ...
The thesis on option pricing by finite difference methods focuses on the numerical methods used to p...
2000 Mathematics Subject Classification: 65M06, 65M12.The paper is devoted to pricing options charac...
Numerical methods are developed for pricing European and American options under Kou’s jump-diffusion...
In this paper we develop a numerical approach to a fractional-order differential linear complementar...
This work deals with the put option pricing problems based on the time-fractional Black-Scholes equa...
© 2017 Elsevier Inc.In this paper we propose a power penalty method for a linear complementarity pro...
In this paper a time-fractional Black-Scholes model (TFBSM) is considered to study the price change ...
In this work, we have derived an approximate solution of the fractional Black-Scholes models using a...
We study the Black-Scholes model for American options with dividends. We cast the problem as a free-...
We study the Black-Scholes model for American options with dividends. We cast the problem as a free-...
Many American option pricing models can be formulated as linear complementarity problems (LCPs) invo...
[EN] In this paper finite difference methods for pricing American option with rationality parameter ...
2020 Elsevier B.V. In this paper, we investigate the European option pricing problem under a regime ...
The Black-Scholes model is commonly used to track the price of European options with respect to matu...
Accurate and efficient numerical solutions have been described for a selection of financial options ...
The thesis on option pricing by finite difference methods focuses on the numerical methods used to p...
2000 Mathematics Subject Classification: 65M06, 65M12.The paper is devoted to pricing options charac...
Numerical methods are developed for pricing European and American options under Kou’s jump-diffusion...