The Unique Solution to the Differential Equations of the Fourth Order with Non-Homogeneous Boundary Conditions
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Keywords

Kernel
Existence results
Differential equation
Fixed point theorems
Three-point non-homogeneous conditions

How to Cite

Madhubabu, B., Sreedhar, N. ., & Prasad, K. . (2022). The Unique Solution to the Differential Equations of the Fourth Order with Non-Homogeneous Boundary Conditions . Journal of Advances in Applied & Computational Mathematics, 9, 193–203. https://doi.org/10.15377/2409-5761.2022.09.15

Abstract

This research paper aims to establish the uniqueness of the solution to fourth-order nonlinear differential equations

v(4)(x) + f (x,v(x)) = 0, x ε [a,b],

with non-homogeneous boundary conditions

where 0 ≤ a < ζ < b, the constants α, ???? are real numbers and f : [a,b] x R →R  is a continuous function with f (x, 0] ≠ 0. Using the sharper bounds on the integral of the kernel, the uniqueness of the solution to the problem is established based on Banach and Rus fixed point theorems on metric spaces.

AMS Subject Classification: 34B15, 34B10.

https://doi.org/10.15377/2409-5761.2022.09.15
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Copyright (c) 2022 Madhubabu B, N. Sreedhar, Kapula Rajendra Prasad