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Sufficient conditions for the existence of positive solutions for a coupled system of nonlinear nonlocal boundary value problems of the type (see PDF for details) are obtained. The nonlinearities (see PDF) are continuous and may be singular at t = 0, t = 1, x = 0, or y = 0. … An example is provided to illustrate the results
AbstractThe existence of positive solutions to second-order singular boundary value problems is esta...
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...
The paper presents the existence result for positive solutions of the differential equation (g(x))&q...
Abstract. Sufficient conditions for the existence of positive solutions for a coupled system of nonl...
Positive solutions (u(t), v(t)) are sought for the nonlocal (m‐point) nonlinear system of bound...
We study the existence and multiplicity of positive solutions for a class of nth-order singular non...
We consider the existence of at least three positive solutions of a nonlinear first order problem wi...
We study the existence and multiplicity of positive solutions for a class of nth-order singular nonl...
We study the existence and multiplicity of positive solutions for a class of nth-order singular nonl...
AbstractFor a given positive integer N, we provide conditions on the nonlinear function f which guar...
AbstractUnder certain assumptions on the nonlinear–nonhomogenous term f(t,u(t)) of ordinary differen...
summary:In this paper we consider a coupled system of second-order boundary value problems with nonl...
AbstractA sufficient condition for the existence of positive solutions of the nonlinear boundary val...
summary:In this paper we consider a coupled system of second-order boundary value problems with nonl...
AbstractBy using fixed point theorem of cone expansion and compression, this paper investigates the ...
AbstractThe existence of positive solutions to second-order singular boundary value problems is esta...
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...
The paper presents the existence result for positive solutions of the differential equation (g(x))&q...
Abstract. Sufficient conditions for the existence of positive solutions for a coupled system of nonl...
Positive solutions (u(t), v(t)) are sought for the nonlocal (m‐point) nonlinear system of bound...
We study the existence and multiplicity of positive solutions for a class of nth-order singular non...
We consider the existence of at least three positive solutions of a nonlinear first order problem wi...
We study the existence and multiplicity of positive solutions for a class of nth-order singular nonl...
We study the existence and multiplicity of positive solutions for a class of nth-order singular nonl...
AbstractFor a given positive integer N, we provide conditions on the nonlinear function f which guar...
AbstractUnder certain assumptions on the nonlinear–nonhomogenous term f(t,u(t)) of ordinary differen...
summary:In this paper we consider a coupled system of second-order boundary value problems with nonl...
AbstractA sufficient condition for the existence of positive solutions of the nonlinear boundary val...
summary:In this paper we consider a coupled system of second-order boundary value problems with nonl...
AbstractBy using fixed point theorem of cone expansion and compression, this paper investigates the ...
AbstractThe existence of positive solutions to second-order singular boundary value problems is esta...
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...
The paper presents the existence result for positive solutions of the differential equation (g(x))&q...
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