An efficient algorithm for solving generalized pantograph equations with linear functional argument
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Publication:613313
DOI10.1016/j.amc.2010.09.005zbMath1204.65083OpenAlexW2047401360MaRDI QIDQ613313
Publication date: 20 December 2010
Published in: Applied Mathematics and Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.amc.2010.09.005
comparison of methodsnumerical exampleshomotopy methodinitial value problemTaylor methodAdomian decomposition methodspline methodsadvanced pantograph equationembedding parameter
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Related Items (14)
Numerical analysis of pantograph differential equation of the stretched type associated with fractal-fractional derivatives via fractional order Legendre wavelets ⋮ Initial value problems with retarded argument solved by iterated quadratic splines ⋮ Collocation method based on Genocchi operational matrix for solving generalized fractional pantograph equations ⋮ Unnamed Item ⋮ Discontinuous functional differential equations with delayed or advanced arguments ⋮ Orthoexponential polynomial solutions of delay pantograph differential equations with residual error estimation ⋮ A Taylor operation method for solutions of generalized pantograph type delay differential equations ⋮ A new collocation method for approximate solution of the pantograph functional differential equations with proportional delay ⋮ Solving fractional pantograph delay equations by an effective computational method ⋮ An efficient algorithm for solving multi-pantograph equation systems ⋮ An exponential approximation for solutions of generalized pantograph-delay differential equations ⋮ Shifted Legendre approximation with the residual correction to solve pantograph-delay type differential equations ⋮ Application of natural transform method to fractional pantograph delay differential equations ⋮ Numerical solution of multi-pantograph delay boundary value problems via an efficient approach with the convergence analysis
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