AbstractFor a class of problems of the form y″=g(t,y)f(y′),0<t<1,y′(0)=m⩽0, y(1)=0, we prove existence of a unique positive solution with y″(t)<0, give necessary and sufficient conditions for y′(1)>−∞, and find asymptotic formulae for y(t) and y′(t) as t→1−. We particularly include cases where the nonlinearity causes singularities at the endpoints of (0,1)
AbstractIn this paper some existence results of positive solutions for the following singular nonlin...
AbstractThe singular nonlinear boundary value problem [equation] arises in the boundary layer theory...
AbstractThe paper presents sufficient conditions for the existence of positive solutions of the equa...
AbstractFor a class of problems of the form y″=g(t,y)f(y′),0<t<1,y′(0)=m⩽0, y(1)=0, we prove existen...
AbstractFor a given positive integer N, we provide conditions on the nonlinear function f which guar...
summary:In this note we consider the boundary value problem $y''=f(x,y,y')$ $\,(x\in [0,X];X>0)$, $y...
AbstractWe examine the existence of solutions of the class of singular nonlinear two-point boundary ...
We discuss the existence of positive solutions for singular second-order boundary value problems x′ ...
AbstractSufficient conditions for existence and nonuniqueness of positive solutions of the singular ...
AbstractBy a new approach, we present a new existence result of positive solutions to the following ...
The paper is concerned with existence results for positive solutions and maximal positive solutions ...
The paper is concerned with existence results for positive solutions and maximal positive solutions ...
In this article, we study a class of nonlinear singular boundary-value problems. We show the exis...
AbstractIn this paper, by the use of a fixed point theorem, many new necessary and sufficient condit...
Using a generalized version of the method of lower and upper solutions, we prove existence of positi...
AbstractIn this paper some existence results of positive solutions for the following singular nonlin...
AbstractThe singular nonlinear boundary value problem [equation] arises in the boundary layer theory...
AbstractThe paper presents sufficient conditions for the existence of positive solutions of the equa...
AbstractFor a class of problems of the form y″=g(t,y)f(y′),0<t<1,y′(0)=m⩽0, y(1)=0, we prove existen...
AbstractFor a given positive integer N, we provide conditions on the nonlinear function f which guar...
summary:In this note we consider the boundary value problem $y''=f(x,y,y')$ $\,(x\in [0,X];X>0)$, $y...
AbstractWe examine the existence of solutions of the class of singular nonlinear two-point boundary ...
We discuss the existence of positive solutions for singular second-order boundary value problems x′ ...
AbstractSufficient conditions for existence and nonuniqueness of positive solutions of the singular ...
AbstractBy a new approach, we present a new existence result of positive solutions to the following ...
The paper is concerned with existence results for positive solutions and maximal positive solutions ...
The paper is concerned with existence results for positive solutions and maximal positive solutions ...
In this article, we study a class of nonlinear singular boundary-value problems. We show the exis...
AbstractIn this paper, by the use of a fixed point theorem, many new necessary and sufficient condit...
Using a generalized version of the method of lower and upper solutions, we prove existence of positi...
AbstractIn this paper some existence results of positive solutions for the following singular nonlin...
AbstractThe singular nonlinear boundary value problem [equation] arises in the boundary layer theory...
AbstractThe paper presents sufficient conditions for the existence of positive solutions of the equa...
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