Bessel matrix differential equations: explicit solutions of initial and two-point boundary value problems

Approximating Initial-Value Problems with Two-Point Boundary-Value Problems: BBM-Equation

Mixed Two-point Boundary-value Problems for Impulsive Differential Equations

In this article, we prove the existence of solutions to mixed twopoint boundary-value problem for impulsive differential equations by variational methods, in both resonant and the non resonant cases.

Two Point Boundary Value Problems for Nonlinear Functional Differential Equations

This paper is concerned with the existence of solutions of two point boundary value problems for functional differential equations. Specifically, we consider /(f) = L(t, yt) +f(t, y,), Mya + Nyb = <A, where M and N are linear operators on C[0, K\. Growth conditions are imposed on /to obtain the existence of solutions. This result is then specialized to the case where L(t, yt) = A(t)y(t), that i...

Existence of solutions of boundary value problems for Caputo fractional differential equations on time scales

‎In this paper‎, ‎we study the boundary-value problem of fractional‎ ‎order dynamic equations on time scales‎, ‎$$‎ ‎^c{Delta}^{alpha}u(t)=f(t,u(t)),;;tin‎ ‎[0,1]_{mathbb{T}^{kappa^{2}}}:=J,;;1

Existence of Solutions for Two Point Boundary Value Problems for Fractional Differential Equations with P-laplacian

In this paper, we study the existence of positive solutions to boundary value problem for fractional differential equation  cDσ 0+(φp(u ′′(t)))− g(t)f(u(t)) = 0, t ∈ (0, 1), φp(u ′′(1)) = 0, φp(u ′′(0)) = 0, αu(0)− βu′(0) = 0, γu(1) + δu′(1) = 0, where cDα 0+ is the Caputo’s fractional derivative of order 1 < σ ≤ 2, φp(s) = |s| p−2s, p > 1, α, β, γ, δ ≥ 0 and f ∈ C([0,∞); [0,∞)), g ∈ C((...