两端固定的奇异梁方程的多重正解

Abstract

Abstract: Let n be an arbitrary natural number. The existence of n positive solutions is proved for a singular beam equation fixed at both ends, where the nonlinear term is a Caratheodory function. Main tools are height functions concerned
with nonlinear term and Guo-Krasnoselskii fixed point theorem of cone expansion-compression type. Further research shows that the equation may have positive solution if the growth limits of nonlinear term at zero and infinity are unbounded functions.

Key words: Nonlinear ordinary differential equation, Boundary value problem, Singularity, Positive solution, Existence, Multiplicity

CLC Number:

34B15

Yao Qingliu. Multiple Positive Solutions to a Singular Beam Equation Fixed at Both Ends[J].Acta mathematica scientia,Series A, 2008, 28(4): 768-778.

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Multiple Positive Solutions to a Singular Beam Equation Fixed at Both Ends

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