ABSTRACT
Many Real 1fe problems are represented mathematically
by both ordinary linear differential equations. Many of such representations
are complicated. Hence the problems are difficult to solve. The Green's
function is a fundamental solution to linear differential equation and is a
building block that can be used to construct many useful solutions. The Green's
friction is an operator, which is used to represent the solution of
non-homogenous differential equation in the form of an integral! We study how
it is constructed from a given boundary value problem and how it is used to
solve the boundary value problems. We obtain the Green's function for the heat
equation, and the wav equation in one-dimensional space.
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IHEANACHO, A (2021). Green's Function And Its Application. Repository.mouau.edu.ng: Retrieved Apr 29, 2024, from https://repository.mouau.edu.ng/work/view/greens-function-and-its-application-7-2
A., IHEANACHO. "Green's Function And Its Application" Repository.mouau.edu.ng. Repository.mouau.edu.ng, 15 Jul. 2021, https://repository.mouau.edu.ng/work/view/greens-function-and-its-application-7-2. Accessed 29 Apr. 2024.
A., IHEANACHO. "Green's Function And Its Application". Repository.mouau.edu.ng, Repository.mouau.edu.ng, 15 Jul. 2021. Web. 29 Apr. 2024. < https://repository.mouau.edu.ng/work/view/greens-function-and-its-application-7-2 >.
A., IHEANACHO. "Green's Function And Its Application" Repository.mouau.edu.ng (2021). Accessed 29 Apr. 2024. https://repository.mouau.edu.ng/work/view/greens-function-and-its-application-7-2