Type: Article
Efficient Scheme for the Economic Heston–Hull–White Problem Using Novel RBF-FD Coefficients Derived from Multiquadric Function Integrals
Journal: Mathematics (22277390)Year: 2024Volume: Issue: 14Pages: 351 - 357
Liu T. Zhao Z. Ling S. Chao H. Nafchi H.F. Shateyi S.Hajiabolhassan H. Vatandoost E.Cheraghi Chaleshtari A.a
Abstract
This study presents an efficient method using the local radial basis function finite difference scheme (RBF-FD). The innovative coefficients are derived from the integrals of the multiquadric (MQ) function. Theoretical convergence rates for the coefficients used in function derivative approximation are provided. The proposed scheme utilizes RBF-FD estimations on three-point non-uniform stencils to construct the final approximation on a tensor grid for the 3D Heston–Hull–White (HHW) PDE, which is relevant in economics and mathematical finance. Numerical evidence and comparative analyses validate the results and the proposed scheme. © 2024 by the authors.
Author Keywords
financial option pricingHHW PDEintegralinterest rateRBF-FDthree-point stencilControllable graphDistinct eigenvaluesIntegral graphControllable graphDistinct eigenvaluesIntegral graphBasis matricesContrastHypergraphPixel expansionSecret sharing schemeVisual cryptography
Other Keywords
CryptographyExpansionAccess structureHypergraphInduced matchingsLower boundsPixel expansionSecret imagesSecret sharing schemesStrong chromatic indexUpper BoundVisual cryptographyVisual cryptography schemesPixels