AbstractThis paper investigates the structure of solutions of singular boundary value problem with superlinear effect. It is proved that the closure of positive solution set possesses a maximal subcontinuum C (i.e., a maximal closed connected subset of solutions), which comes from (0,θ) and tends to (0,+∞) finally. As a corollary, the existence of multiple positive solutions and the behavior of solutions according to parameter λ are obtained
AbstractWe present some results on the existence and multiplicity of solutions for boundary value pr...
In this note we describe how to approximate some classes of singular equations by nonsingular equati...
AbstractWe obtain a new fixed point theorem in cone, which extend the Krasnosel’skii’s compression–e...
summary:This paper studies the existence of solutions to the singular boundary value problem \[ \lef...
AbstractIn this paper we study the existence of positive solutions of the equation (φ(x′))′+a(t)f(x(...
AbstractIn this paper, by the use of a fixed point theorem, many new necessary and sufficient condit...
AbstractWe study classes of boundary value problems involving the p-Laplacian operator and nonlinear...
AbstractUsually we do not think there is variational structure for singular elliptic boundary value ...
summary:Let $p>1$, $q>p$, $\lambda >0$ and $s\in ]1,p[$. We study, for $s\rightarrow p^-$, the behav...
AbstractThe existence of a positive, radial solution for superlinear elliptic boundary value problem...
AbstractThis paper proves the existence, multiplicity, and nonexistence of symmetric positive soluti...
AbstractThe goal of this paper is to study the existence and uniqueness of positive solutions for th...
We prove existence of nonnegative solutions to -Delta u + u = 0 on a smooth bounded domain Omega sub...
AbstractWe prove existence, local uniqueness and asymptotic estimates for boundary layer solutions t...
AbstractWe show that there exists at least one positive solution for Lidstone boundary value problem...
AbstractWe present some results on the existence and multiplicity of solutions for boundary value pr...
In this note we describe how to approximate some classes of singular equations by nonsingular equati...
AbstractWe obtain a new fixed point theorem in cone, which extend the Krasnosel’skii’s compression–e...
summary:This paper studies the existence of solutions to the singular boundary value problem \[ \lef...
AbstractIn this paper we study the existence of positive solutions of the equation (φ(x′))′+a(t)f(x(...
AbstractIn this paper, by the use of a fixed point theorem, many new necessary and sufficient condit...
AbstractWe study classes of boundary value problems involving the p-Laplacian operator and nonlinear...
AbstractUsually we do not think there is variational structure for singular elliptic boundary value ...
summary:Let $p>1$, $q>p$, $\lambda >0$ and $s\in ]1,p[$. We study, for $s\rightarrow p^-$, the behav...
AbstractThe existence of a positive, radial solution for superlinear elliptic boundary value problem...
AbstractThis paper proves the existence, multiplicity, and nonexistence of symmetric positive soluti...
AbstractThe goal of this paper is to study the existence and uniqueness of positive solutions for th...
We prove existence of nonnegative solutions to -Delta u + u = 0 on a smooth bounded domain Omega sub...
AbstractWe prove existence, local uniqueness and asymptotic estimates for boundary layer solutions t...
AbstractWe show that there exists at least one positive solution for Lidstone boundary value problem...
AbstractWe present some results on the existence and multiplicity of solutions for boundary value pr...
In this note we describe how to approximate some classes of singular equations by nonsingular equati...
AbstractWe obtain a new fixed point theorem in cone, which extend the Krasnosel’skii’s compression–e...