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Research Paper | Mathematics | India | Volume 10 Issue 2, February 2021
Neumann Boundary Condition on Taylor Series Method
Dr. Chitra Singh [6] | Mukesh Yadav [2]
Abstract: In this paper, a Neumann boundary condition for solving the Taylor’s series method with constant coefficient and analytic initial condition in two & three independent variable is presented. The technique is based upon Taylor’s expansion. The Taylor series may not converge if the solution is not analytic in the whole domain, however the present method can be applied on Neumann boundary condition for linear partial differential equation, when the solution is analytic in the interior of the domain and also a some open subsets for each distinct part of the boundary. The method is computationally attractive and application is demonstrated through illustrative examples
Keywords: Taylor series, nth order linear differential equation, Ordinary differential equation, Neumann boundary condition
Edition: Volume 10 Issue 2, February 2021,
Pages: 1540 - 1542
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Research Paper, Mathematics, India, Volume 11 Issue 8, August 2022
Pages: 1360 - 1362A Taylor Series Method for the Solution of the Boundary Value Problems for Higher Order Ordinary Differential Equation
Dr. Chitra Singh [6] | Mukesh Yadav [2]
Downloads: 105
Research Paper, Mathematics, India, Volume 4 Issue 11, November 2015
Pages: 1398 - 1402