Existence results for a system of fractional differential equations subject to coupled integral boundary conditions
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Date
2016
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Publisher
University of Management and Technology Lahore
Abstract
Recently, Johnny Henderson and Rodica Luca [1], have presented some new existence and uniqueness results, and for this, they have used a variety of theorems. They have worked on fractional differential equations, and have investigated the uniqueness and existence for non-negative solutions of a system of nonlinear Riemann-Liouville fractional differential equations
α v1(t) + λ1f (t, v1(t), v2(t)) = 0, where t ∈ (0, 1) and n − 1 < α ™ n
β v2(t) + λ2g(t, v1(t), v2(t)) = 0, where t ∈ (0, 1), and m − 1 < β ™ m
with the coupled integral boundary conditions
j n−2 ∫ 1
j m−2 ∫ 1
where m, n ∈ N ; m, n “ 3; Dα and Dβ are the derivatives from Riemann-Liouville with
orders α, β respectively. Further, the integrals in the boundary conditions are the integrals from Riemann-Stieltjes. Some adequate conditions will be given on the parameters λ1, λ2, and nonlinear functions f and g, so that non-negative solutions of the above problem exist. This thesis is detailed review of the results presented in [1].
Description
Supervised by:Dr. Naseer Ahmad Asif
Keywords
Recently, Johnny, Uniqueness results, Master Thesis