We study the existence and structure of entire explosive positive radial solutions for quasilinear elliptic systems (div(u~(m-2)u))=p(x)f(v), div(v~(n-2)v)=q(x)g(u) on R~N, where f and g are positive and non-decreasing functions on (0,∞).

In this paper,an existence result of symmetric positive solution for fourth-order boundary value problems is obtained by using the fixed-point index thoery.

The two iterative schemes of symmetric positive solution are studied for a two-point boundary value problem by the help of monotonic technique.

In this paper,we discuss the existence of symmetric positive solutions for a kind of for fourth-order two point boundary value problem.

Existence of symmetric positive solutions for second-order four-point boundary value problems with a p-Laplacian operator on time scales

By using the Legget-Williams fixed point theory the existing conditions of the multiple symmetric positive solutions for a second order boundary value problerm are gained and its application is given.

This paper applies the fixed point theorem to the obtaining of sufficient conditions for the existence of symmetric positive solutions to a class of second-order singular boundary value problems:-x″=λf(t,x),and x(0)=x(1)=0.

The symmetric positive definite solutions of matrix equations (AX,XB)=(C,D) and AXB=C are considered in this paper.

In this paper,we study the problem about the symmetric positive definite solution to a class of mixed-type Lyapunov matrix equations.