[PDF] Top 20 Operational matrix based on Genocchi polynomials for solution of delay differential equations

... and polynomials have been extensively studied in many different context in branches of mathematics such as elementary number theory and complex analytic number the- ory, in which this polynomials are highly ... See full document

... pantograph equations with linear functional ...pantograph delay integrodifferential equations and in [9] Y¨uzbasi and Sezer presented an exponential approximation for solutions of gen- eralized ... See full document

... a matrix method for solving system of linear Fredholm integro-differential equations(FIDEs) of the second kind on unbounded domain with degenerate kernels in terms of generalized Laguerre ...is ... See full document

... Chebyshev polynomials are well known for differential and partial differential equations ...the solution at any point of the desired ...numerical solution of the system (1) using ... See full document

... linear matrix differential equations of second ...the operational matrix of the integration based on the Bernstein multi- scaling polynomials are used to reduce the main ... See full document

... an operational formulation of the Tau method based upon orthogonal polynomials by using a reduced set of matrix operations for the numerical solution of nonlinear multi-order fractional ... See full document

... numerical solution of singular nonlinear differential equations, stemming from biology and physiology problems, is ...primarily based on the shifted Chebyshev polynomials ... See full document

... constructed operational matrix of derivative of hybrid the third kind Chebyshev polynomials and Block-pulse ...integro-differential equations to system of linear algebraic ... See full document

... practical matrix method for solving nonlinear Volterra-Fredholm integro-differential equa- tions under initial conditions in terms of Bernstein polynomials on the interval ...matrices’ ... See full document

... coefficient matrix for approximation of fractional derivatives has been ...The matrix is used to get approximate numerical solu- tions of fractional Riccati differential ... See full document

... Bernstein polynomials are introduced and derived operational matrices of integration P , dual Q, differentiation D, product C b and delay Del by a general ...the solution of delay ... See full document

... Chebyshev polynomials of the second kind (FCSs). Also we construct the operational matrix of fractional derivative of order γ in the Caputo for FCSs and show that this matrix with the Tau ... See full document

... ordinary differential equation can continuously holds ...beam differential equations with initial or boundary conditions ...An operational matrix of integration based on the Haar ... See full document

... Wavelet is compactly supported [1] square integrable function in time domain and frequency domain. Firstly, wavelet was introduced by N. Ricker [2] in Seismology to provide a time dimension to seismic analysis. Also, it ... See full document

... differential equations. Adomian Decomposition method is applied to these equations by using Taylor series expansion and Chebyshev polynomial representation of source ... See full document

... To obtain the exact analytic solutions of Fractional Differential Equation,it is very difficult and some time impossible to deal with the complexities computations in these equations.So it is better,to look for ... See full document

... stochastic differential equations arise in many problems in mechanics, finance, biology, medical, social sciences and etc ...These equations are often dependent on a noise source, on a Gaussian white ... See full document

... and polynomials. We prove a new relation for the generalized q-Genocchi numbers, which is related to the q-Genocchi numbers and q-Bernoulli ...and polynomials at negative ... See full document

... 15 polynomials. These polynomials have been used in both the solution of boundary value problems 16–19 and in computational fluid dynamics ...differential equations for the expansion coefficients ... See full document

... DOI: 10.4236/jamp.2018.64057 656 Journal of Applied Mathematics and Physics [3] Kwon, J., Noh, H.S., Jeong, S.H., Kim, A.J., Lee, J.H. and Rim, S.-H. (2015) A Note on Weighted Changhee Polynomials and Numbers. ... See full document