2020
DOI: 10.48129/kjs.v48i1.9386
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A novel computational method for solving nonlinear Volterra integro-differential equation

Abstract: In this paper, we study quasilinear Volterra integro-differential equations (VIDEs). Asymptotic estimates are made for the solution of VIDE. Finite difference scheme, which is accomplished by the method of integral identities using interpolating quadrature rules with weight functions and remainder term in integral form, is presented for the VIDE. Error estimates are carried out according to the discrete maximum norm. It is given an effective quasilinearization technique for solving nonlinear VIDE. The theoreti… Show more

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Cited by 5 publications
(8 citation statements)
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“…, which points to the proof of (2.4). Now, we show the proof of the relation (2.5) (see [9,11,13,29]). From (2.6), we write…”
Section: Preliminariesmentioning
confidence: 87%
See 2 more Smart Citations
“…, which points to the proof of (2.4). Now, we show the proof of the relation (2.5) (see [9,11,13,29]). From (2.6), we write…”
Section: Preliminariesmentioning
confidence: 87%
“…Applying interpolating quadrature rules [5] and some manipulations in [11,29] for the first term and the second term of the relation (3.1), we find…”
Section: Discrete Schemementioning
confidence: 99%
See 1 more Smart Citation
“…Here, by the formula of g(x) given in (11), from (3) and knowing that a, f ∈ C 1 (I), K ∈ C 1 (I × I) and from ( 4) we obtain…”
Section: Asymptotic Behavior Of the Solutionmentioning
confidence: 99%
“…Therefore, some important techniques have been introduced in the literature. These involve: finite difference methods [1,4,5,8,11,12,15], fitted mesh method [23], reproducing kernel method [7], factorization method [25], Galerkin method [18,26], differential transform method [9], variational iteration methods [2,10] and so on [6,16,19,20,27].…”
Section: Introductionmentioning
confidence: 99%