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Superconvergence results for the nonlinear Fredholm–Hemmerstein integral equations of second kind
ISSN
09713611
Date Issued
2021-03-01
Author(s)
Mandal, Moumita
Nelakanti, Gnaneshwar
DOI
10.1007/s41478-020-00247-9
Abstract
The multi-projection methods for solving the Fredholm-Hammerstein integral equation is proposed in this paper. We obtain the similar super-convergence results as in Mandal and Nelakanti (J Comput Appl Math 319:423–439, 2017) with a smooth kernel using piecewise polynomials of degree ≤ r- 1 , i.e., for both the multi-Galerkin and multi-collocation methods have order of convergence O(h3r) in uniform norm, where h is the norm of the partition. We have also considered iterated version of these methods and prove that both iterated multi-Galerkin and iterated multi-collocation methods have order of convergence O(h4r) in uniform norm. Numerical examples are given to illustrate the theoretical results.