In this article, an applied matrix method, which is based on Bernouli Polynomials, has been presented to find approximate solutions of high order Volterra integro-differential equations. Through utilizing this approach, the proposed equations reduce to a system of algebric equations with unknown Bernouli coefficients. A number of numerical illustrations have been solved to assert the credibility and practically of this method
Matinfar,M , Abdollahi Lashaki,H and Akbari,M . (2026). Numerical approximation based on the Bernouli polynomials for solving Volterra integro-differential equations of high order. Mathematical Research, 3(2), 19-32. doi: 10.29252/mmr.2.3.19
MLA
Matinfar,M , , Abdollahi Lashaki,H , and Akbari,M . "Numerical approximation based on the Bernouli polynomials for solving Volterra integro-differential equations of high order", Mathematical Research, 3, 2, 2026, 19-32. doi: 10.29252/mmr.2.3.19
HARVARD
Matinfar M, Abdollahi Lashaki H, Akbari M. (2026). 'Numerical approximation based on the Bernouli polynomials for solving Volterra integro-differential equations of high order', Mathematical Research, 3(2), pp. 19-32. doi: 10.29252/mmr.2.3.19
CHICAGO
M Matinfar, H Abdollahi Lashaki and M Akbari, "Numerical approximation based on the Bernouli polynomials for solving Volterra integro-differential equations of high order," Mathematical Research, 3 2 (2026): 19-32, doi: 10.29252/mmr.2.3.19
VANCOUVER
Matinfar M, Abdollahi Lashaki H, Akbari M. Numerical approximation based on the Bernouli polynomials for solving Volterra integro-differential equations of high order. Mathematical Research. 2026;3(2):19-32 (In Persian). doi: 10.29252/mmr.2.3.19