Green’s Function Laplace Transforms

  • Raza Tahir-KheliEmail author


Consider an inhomogeneous linear ordinary differential equation. \(V(x)\, Y(x)=F(x).\) The differential operator V(x),  the solution Y(x),  and quite possibly also the inhomogeneous term represented by the arbitrary function F(x) involve constants and derivatives with respect to the variable x. The objective of the present exercise is to determine the solution, Y(x),  of the differential equation (5.1) with specified boundary conditions.

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© Springer Nature Switzerland AG 2018

Authors and Affiliations

  1. 1.Department of PhysicsTemple UniversityPhiladelphiaUSA

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