This paper contributes a new matrix method for solving systems of high-order linear differential–difference equations with variable coefficients under given initial conditions. On the basis of the presented approach, the matrix forms of the Euler polynomials and their derivatives are constructed, and then by substituting the collocation points into the matrix forms, the fundamental matrix equation is formed. This matrix equation corresponds to a system of linear algebraic equations. By solving this system, the unknown Euler coefficients are determined. Some illustrative examples with comparisons are given. The results demonstrate reliability and efficiency of the proposed method.
Mirzaee, F., & Bimesl, S. (2015). Solving systems of high-order linear differential– difference equations via Euler matrix method. Journal of the Egyptian Mathematical Society, 23(2), 286-291. doi: 10.1016/j.joems.2014.05.003
MLA
Farshid Mirzaee; Saeed Bimesl. "Solving systems of high-order linear differential– difference equations via Euler matrix method", Journal of the Egyptian Mathematical Society, 23, 2, 2015, 286-291. doi: 10.1016/j.joems.2014.05.003
HARVARD
Mirzaee, F., Bimesl, S. (2015). 'Solving systems of high-order linear differential– difference equations via Euler matrix method', Journal of the Egyptian Mathematical Society, 23(2), pp. 286-291. doi: 10.1016/j.joems.2014.05.003
VANCOUVER
Mirzaee, F., Bimesl, S. Solving systems of high-order linear differential– difference equations via Euler matrix method. Journal of the Egyptian Mathematical Society, 2015; 23(2): 286-291. doi: 10.1016/j.joems.2014.05.003
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