In studying existence of positive solutions for boundary value problems, fixed point theory has been widely applied. The common idea is to properly construct a cone and apply

In [33] I consider a sum of a linear and a nonlinear operator of a much more general type, I calculate the local order of 12 (three types of splittings combined with four

A NH , Asymptotic expansions of solutions of the first initial boundary value problem for the Schrödinger systems near conical points of the boundary,

Even if we deal with an initial value problem instead of a boundary value problem, the differential inclusion (1.1) may be regarded as an extension to the set-valued framework of

Uniqueness and large time behavior of solution of initial-boundary value problem with mixed boundary conditions as well as finite difference scheme for one nonlinear

Even if we deal with an initial value problem instead of a boundary value problem, the differential inclusion (1.1) may be regarded as an extension to the set-valued framework of

Recently, there are some papers which deal with the existence of the solutions of the initial value problem or the linear boundary values problems for fractional

We will deal with a first order func- tional boundary value problem on an infinite interval, seeking positive non-zero solutions.. In Section 1 we state the boundary value problem

If we regard an ODE as a function which orders value of steepness to the points of the place then the point serial giving the solution can be written by the help of vector

We construct a model that approximates a solution of the boundary-value problem (2.1)–(2.3) for the hyperbolic equation with random initial conditions.. The model is convenient to

Glazatov, Nonlocal boundary value problems for linear and nonlinear equations of variable type, Sobolev Institute of Mathematics SB RAS, Preprint no.. Karatopraklieva, On a

In the third section, we take a semidiscrete form of (1.1) – (1.3), and show that the semidiscrete solution goes to zero as t tends to infinity and give its asymptotic behavior.. In

Ge, Nonlocal boundary value problem of higher order ordinary differential equations at resonance, Rocky Mountain J.. Kong, Solutions of second order multi-point boundary value

In the present paper, we obtain an existence result for a class of mixed bound- ary value problems for second-order differential equations.. A critical point theorem is used, in

Yang, Multiple symmetric positive solutions of a class of boundary value problems for higher order ordinary differential equations, Proc... Yang, On a nonlinear boundary value

Yang, Multiple symmetric positive solutions of a class of boundary value problems for higher order ordinary differential equations, Proc.. Yang, A three point boundary value problem

J iang , Upper and lower solutions method and a singular superlinear boundary value problem for the one-dimensional p-Laplacian, Comput.. A garwal , Nonresonant singular boundary

Keywords: Boundary value problem; Multi-point boundary condition; Integral bound- ary condition; Resonance; Half-line; p-Laplacian.. MSC: 34B10;