An integration preconditioning method for solving option pricing problems

This paper is concerned with the numerical solution of partial integrodifferential equation for option pricing models under a tempered stable process known as CGMY model. A double discretization finite difference scheme is used for the treatment of the unbounded nonlocal integral term. We also introduce in the scheme the Patankar-trick to guarantee unconditional nonnegative numerical solutions. Integration formula of open type is used in order to improve the accuracy of the approximation of the integral part. Stability and consistency are also studied. Illustrative examples are included.

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Analytical shape functions and derivatives approximation formulas in local radial point interpolation methods with applications to financial option pricing problems

Computers & Mathematics with Applications ◽

10.1016/j.camwa.2019.06.005 ◽

2019 ◽

Vol 78 (12) ◽

pp. 3770-3789

Author(s):

Nawdha Thakoor

Keyword(s):

Option Pricing ◽

Shape Functions ◽

Interpolation Methods ◽

Radial Point Interpolation ◽

Approximation Formulas ◽

Point Interpolation ◽

Financial Option Pricing ◽

Pricing Problems

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A mixed derivative terms removing method in multi-asset option pricing problems

Applied Mathematics Letters ◽

10.1016/j.aml.2016.04.011 ◽

2016 ◽

Vol 60 ◽

pp. 108-114 ◽

Cited By ~ 10

Author(s):

R. Company ◽

V.N. Egorova ◽

L. Jódar ◽

F. Soleymani

Keyword(s):

Option Pricing ◽

Mixed Derivative ◽

Pricing Problems

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Tri-Diagonal Preconditioner for Toeplitz Systems from Finance

East Asian Journal on Applied Mathematics ◽

10.4208/eajam.260609.190510a ◽

2011 ◽

Vol 1 (1) ◽

pp. 82-88

Author(s):

Hong-Kui Pang ◽

Ying-Ying Zhang ◽

Xiao-Qing Jin

Keyword(s):

Differential Equation ◽

Theoretical Analysis ◽

Convergence Rate ◽

Option Pricing ◽

Gradient Method ◽

Preconditioned Conjugate Gradient ◽

Superlinear Convergence Rate ◽

Pricing Problems ◽

Toeplitz Systems ◽

Toeplitz System

AbstractWe consider a nonsymmetric Toeplitz system which arises in the discretization of a partial integro-differential equation in option pricing problems. The preconditioned conjugate gradient method with a tri-diagonal preconditioner is used to solve this system. Theoretical analysis shows that under certain conditions the tri-diagonal preconditioner leads to a superlinear convergence rate. Numerical results exemplify our theoretical analysis.

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A front-fixing ETD numerical method for solving jump–diffusion American option pricing problems

Mathematics and Computers in Simulation ◽

10.1016/j.matcom.2020.07.015 ◽

2020 ◽

Author(s):

Rafael Company ◽

Vera N. Egorova ◽

Lucas Jódar

Keyword(s):

Option Pricing ◽

Numerical Method ◽

Jump Diffusion ◽

American Option ◽

American Option Pricing ◽

Pricing Problems

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Conservative Third-Order Central-Upwind Schemes for Option Pricing Problems

Vietnam Journal of Mathematics ◽

10.1007/s10013-019-00360-8 ◽

2019 ◽

Vol 47 (4) ◽

pp. 813-833

Author(s):

Omishwary Bhatoo ◽

Arshad Ahmud Iqbal Peer ◽

Eitan Tadmor ◽

Désiré Yannick Tangman ◽

Aslam Aly El Faidal Saib

Keyword(s):

Option Pricing ◽

Third Order ◽

Upwind Schemes ◽

Pricing Problems

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Power Systems Investments

Innovation in Power, Control, and Optimization ◽

10.4018/978-1-61350-138-2.ch008 ◽

2011 ◽

pp. 248-267

Author(s):

João Zambujal-Oliveira

Keyword(s):

Monte Carlo ◽

Brownian Motion ◽

Power Systems ◽

Option Pricing ◽

Real Options ◽

Geometric Brownian Motion ◽

Real Options Approach ◽

Pricing Problems ◽

Recursive Solutions ◽

Poor Adhesion

The study employs a real options approach that doesn’t need to capture all the uncertainty and proposes a process that directly determines the uncertainty associated with the first period. The results support that its use can be considered fair. However, it shows that long periods of operation and poor adhesion to the geometric Brownian motion by the project returns might call into question its use in the energy market. The values for option pricing have remained inside acceptable ranges, but some shortfalls could be found. First, the study employs Monte Carlo simulations, which can be viewed as forward-looking processes, and option pricing problems need backward recursive solutions. Second, the study shows that its simplicity produces results as accurate as those gathered from approaches with added complexity and computational needs.

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Option bounds

Journal of Applied Probability ◽

10.1017/s0021900200112264 ◽

2004 ◽

Vol 41 (A) ◽

pp. 145-156 ◽

Cited By ~ 4

Author(s):

Victor H. De La Peña ◽

Rustam Ibragimov ◽

Steve Jordan

Keyword(s):

Option Pricing ◽

Absolutely Continuous ◽

Sharp Estimates ◽

Monte Carlo Techniques ◽

Option Pricing Model ◽

Pricing Problems ◽

Modelling Assumptions ◽

Option Bounds ◽

Expected Payoffs ◽

Entire Distribution

In this paper, we obtain sharp estimates for the expected payoffs and prices of European call options on an asset with an absolutely continuous price in terms of the price density characteristics. These techniques and results complement other approaches to the derivative pricing problem. Exact analytical solutions to option-pricing problems and to Monte-Carlo techniques make strong assumptions on the underlying asset's distribution. In contrast, our results are semi-parametric. This allows the derivation of results without knowing the entire distribution of the underlying asset's returns. Our results can be used to test different modelling assumptions. Finally, we derive bounds in the multiperiod binomial option-pricing model with time-varying moments. Our bounds reduce the multiperiod setup to a two-period setting, which is advantageous from a computational perspective.

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