AbstractWe obtain a new fixed point theorem in cone, which extend the Krasnosel’skii’s compression–expansion theorem in cones. Under a quite relaxed condition two theorems for the existence of positive solutions of p-Laplacian boundary value problems are proved
AbstractLet a∈C[0,1], b∈C([0,1],(−∞,0]). Let φ1(t) be the unique solution of the linear boundary val...
AbstractWe solve boundary value problems for p-Laplacian systems using sandwich pairs
AbstractWe study the existence of positive solutions of boundary value problems on the half-line for...
AbstractThe existence of a positive, radial solution for superlinear elliptic boundary value problem...
AbstractIn this paper, by using Krasnoselskii’s Fixed Point Theorem in a cone, we study the existenc...
AbstractThis paper proves the existence, multiplicity, and nonexistence of symmetric positive soluti...
AbstractIn this paper, by the use of a fixed point theorem, many new necessary and sufficient condit...
AbstractWe study the existence of positive solutions for the following boundary value problem on inf...
AbstractA new fixed point theorem in a cone is applied to obtain the existence of at least one posit...
AbstractThe goal of this paper is to study the existence and uniqueness of positive solutions for th...
AbstractIn this paper, we afford some sufficient conditions to guarantee the existence of multiple ...
AbstractIn this paper we consider the multipoint boundary value problem for one-dimensional p-Laplac...
AbstractThe existence and multiplicity of positive solutions are established for the multi-point bou...
AbstractIn this paper, by means of fixed point theorem in a cone, the existence of positive solution...
AbstractIn this paper, by using the fixed point index method, we establish the existence of at least...
AbstractLet a∈C[0,1], b∈C([0,1],(−∞,0]). Let φ1(t) be the unique solution of the linear boundary val...
AbstractWe solve boundary value problems for p-Laplacian systems using sandwich pairs
AbstractWe study the existence of positive solutions of boundary value problems on the half-line for...
AbstractThe existence of a positive, radial solution for superlinear elliptic boundary value problem...
AbstractIn this paper, by using Krasnoselskii’s Fixed Point Theorem in a cone, we study the existenc...
AbstractThis paper proves the existence, multiplicity, and nonexistence of symmetric positive soluti...
AbstractIn this paper, by the use of a fixed point theorem, many new necessary and sufficient condit...
AbstractWe study the existence of positive solutions for the following boundary value problem on inf...
AbstractA new fixed point theorem in a cone is applied to obtain the existence of at least one posit...
AbstractThe goal of this paper is to study the existence and uniqueness of positive solutions for th...
AbstractIn this paper, we afford some sufficient conditions to guarantee the existence of multiple ...
AbstractIn this paper we consider the multipoint boundary value problem for one-dimensional p-Laplac...
AbstractThe existence and multiplicity of positive solutions are established for the multi-point bou...
AbstractIn this paper, by means of fixed point theorem in a cone, the existence of positive solution...
AbstractIn this paper, by using the fixed point index method, we establish the existence of at least...
AbstractLet a∈C[0,1], b∈C([0,1],(−∞,0]). Let φ1(t) be the unique solution of the linear boundary val...
AbstractWe solve boundary value problems for p-Laplacian systems using sandwich pairs
AbstractWe study the existence of positive solutions of boundary value problems on the half-line for...
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