18 eredmény a kulcsszóra: 'initial boundary value problem'
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
N/A
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
N/A
A NH , Asymptotic expansions of solutions of the first initial boundary value problem for the Schrödinger systems near conical points of the boundary,
N/A
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
N/A
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
N/A
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
N/A
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
N/A
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
N/A
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
N/A
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
N/A
Glazatov, Nonlocal boundary value problems for linear and nonlinear equations of variable type, Sobolev Institute of Mathematics SB RAS, Preprint no.. Karatopraklieva, On a
N/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
N/A
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
N/A
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
N/A
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
N/A
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
N/A
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
N/A