Quasi-Interpolation Operators for Bivariate Quintic Spline Spaces and Their Applications

Abstract: Splines and quasi-interpolation operators are important both in approximation theory and applications. In this paper, we construct a family of quasi-interpolation operators for the bivariate quintic spline spaces S 3 5 p∆ p2q mn q. Moreover, the properties of the proposed quasi-interpolation operators are studied, as well as its applications for solving the two-dimensional Burgers' equation and image reconstruction. Some numerical examples show that these methods, which are easy to implement, provide accurate … Show more

“…During the past decades, various numerical techniques have been developed for the solution of 2-D Burgers' equation. Bahadir [7] introduced one fully implicit finite difference scheme, then Zhu et al [8] proposed the discrete Adomian decomposition method (ADM), Yu et al [9] applied the bivariate quintic spline to solve numerically.…”

Numerical Solution of High-Dimensional Shockwave Equations by Bivariate Multi-Quadric Quasi-Interpolation

“…During the past decades, various numerical techniques have been developed for the solution of 2-D Burgers' equation. Bahadir [7] introduced one fully implicit finite difference scheme, then Zhu et al [8] proposed the discrete Adomian decomposition method (ADM), Yu et al [9] applied the bivariate quintic spline to solve numerically.…”

Numerical Solution of High-Dimensional Shockwave Equations by Bivariate Multi-Quadric Quasi-Interpolation