References
- G.AdomianA review of the decomposition method and some recent results for nonlinear equationMathematical and Computer Modelling13719901743
- G.AdomianSolving Frontire Problems of Physics-the Decomposition Method1994KluwerDordrecht
- G.AdomianR.RachNoise terms in decomposition series solutionComputer and Mathematics with Applications241119926164
- J.BiazarB.GhanbariM.Gholami PorshokouhiM.Gholami PorshokouhiHe’s homotopy perturbation method: a strongly promising method for solving non-linear systems of the mixed Volterra–Fredholm integral equationsComputer and Mathematics with Applications61201110161023
- H.BrunnerOn the numerical solution of nonlinear Volterra–Fredholm integral equation by collocation methodsSIAM Journal on Numerical Analysis27419909781000
- A.CardoneE.MessinaE.RussoA fast iterative method for discretized Volterra–Fredholm integral equationsJournal of Computational and Applied Mathematics1892006568579
- Y.CherruaultG.SaccomandiB.SomeNew results for convergence of Adomian’s method applied to integral equationsMathematical and Computer Modelling162199285
- O.DiekmannThresholds and travelling waves for the geographical spread of infectionJournal Mathematical Biology61978109130
- H.GuoqiangAsymptotic error expansion for the Nystrom method for a nonlinear Volterra–Fredholm integral equationsComputer and Mathematics with Applications5919954959
- L.HaciaOn approximate solution for integral equations of mixed typeZeitschrift für Angewandte Mathematik761996415416
- Z.H.JiangW.SchaufelbergerBlock Pulse functions and their applications in control systems1992Spriger-VerlagBerlin
- P.G.KauthenContinuous time collocation methods for Volterra–Fredholm integral equationsNumerische Mathematik561989409424
- K.MaleknejadM.R.Fadaei YamiA computational method for system of Volterra–Fredholm integral equationsApplied Mathematics and Computation1832006589595
- K.MaleknejadM.HadizadehA new computational method for Volterra–Fredholm integral equationsComputer and Mathematics with Applications37199918
- K.MaleknejadK.MahdianiSolving nonlinear mixed Volterra–Fredholm integral equations with two dimensional block-pulse functions using direct methodCommunications in Nonlinear Science and Numerical Simulation16201135123519
- K.MaleknejadB.RahimiModification of block pulse functions and their application to solve numerically Volterra integral equation of the first kindCommunications in Nonlinear Science and Numerical Simulation16201124692477
- K.MaleknejadS.SohrabiB.BaranjiApplication of 2D-BPFs to nonlinear integral equationsCommunications in Nonlinear Science and Numerical Simulation152010527535
- B.G.PachpatteOn mixed Volterra–Fredholm type integral equationsIndian Journal of Pure and Applied Mathematics171978488496
- H.R.ThiemeA model for spatial spread of an epidemicJournal of Mathematical Biology41977337351
- A.M.WazwazA reliable treatment for mix Volterra–Fredholm integral equationsApplied Mathematics and Computation1892006405414
- E.YeeApplication of the decomposition method to the solve of the reaction–convection–diffusion equationApplied Mathematics and Computation561993114