Boundary value problems for doubly perturbed first order ordinary differential systems.
Boundary value problems for evolution inclusions
Boundary value problems for first order multivalued differential systems
We present some existence results for boundary value problems for first order multivalued differential systems. Our approach is based on topological transversality arguments, fixed point theorems and differential inequalities.
Boundary value problems for functional-differential equations with nonlinear boundary conditions
This paper is concerned with the existence of solutions for some class of functional integrodifferential equations via Leray-Schauder Alternative. These equations arised in the study of second order boundary value problems for functional differential equations with nonlinear boundary conditions.
Boundary value problems for generalized linear differential equations
Boundary value problems for generalized linear integrodifferential equations with left-continuous solutions
Boundary value problems for Hadamard-Caputo implicit fractional differential inclusions with nonlocal conditions
In this paper, the authors establish sufficient conditions for the existence of solutions to implicit fractional differential inclusions with nonlocal conditions. Both of the cases of convex and nonconvex valued right hand sides are considered.
Boundary value problems for higher order ordinary differential equations
Let be a Carath’eodory’s function. Let , with , and be two real sequences. In this paper, the family of boundary value problems is considered. It is proved that these boundary value problems admit at least a solution for each , where is a suitable integer. Some particular cases, obtained by specializing the sequence , are pointed out. Similar results are also proved for the Picard problem.
Boundary value problems for linear differential equations of operators
Boundary value problems for linear generalized differential equations and their adjoints
Boundary value problems for nonlinear perturbations of some ϕ-Laplacians
This paper surveys a number of recent results obtained by C. Bereanu and the author in existence results for second order differential equations of the form (ϕ(u'))' = f(t,u,u') submitted to various boundary conditions. In the equation, ϕ: ℝ → ≤ ]-a,a[ is a homeomorphism such that ϕ(0) = 0. An important motivation is the case of the curvature operator, where ϕ(s) = s/√(1+s²). The problems are reduced to fixed point problems in suitable function space, to which Leray-Schauder...
Boundary value problems for ODEs
We use the method of quasilinearization to boundary value problems of ordinary differential equations showing that the corresponding monotone iterations converge to the unique solution of our problem and this convergence is quadratic.
Boundary value problems for ordinary linear differential equations in the Colombeau algebra
Boundary value problems for -difference inclusions.
Boundary value problems for semilinear evolution inclusions: Carathéodory selections approach
In this paper we prove two existence theorems for abstract boundary value problems controlled by semilinear evolution inclusions in which the nonlinear part is a lower Scorza-Dragoni multifunction. Then, by using these results, we obtain the existence of periodic mild solutions.
Boundary value problems for strongly nonlinear second order differential inclusions
Boundary value problems for systems of functional differential equations
Algorithms for finding an approximate solution of boundary value problems for systems of functional ordinary differential equations are studied. Sufficient conditions for consistency and convergence of these methods are given. In the last section, a construction of methods of arbitrary order is presented.
Boundary value problems for systems of nonlinear differential equations
Boundary value problems for systems of second-order dynamic equations on time scales with -Carathéodory functions.
Boundary value problems for systems of second-order functional differential equations.