一类p-Laplacian方程单侧全局区间分歧及应用

数学物理学报 ›› 2018, Vol. 38 ›› Issue (4): 770-778.

一类p-Laplacian方程单侧全局区间分歧及应用

沈文国

兰州工业学院基础学科部兰州 730050

收稿日期:2016-09-14 修回日期:2017-10-16 出版日期:2018-08-26 发布日期:2018-08-26
作者简介:沈文国,E-mail:shenwg369@163.com
基金资助:
国家自然科学基金（11561038）和甘肃省自然科学基金（145RJZA087）

Interval Bifurcation for the p-Laplacian Equation and Its Applications

Shen Wenguo

Department of Basic Courses, Lanzhou Institute of Technology, Lanzhou 730050

Received:2016-09-14 Revised:2017-10-16 Online:2018-08-26 Published:2018-08-26
Supported by:
Supported by the NSFC (11561038) and the National Science Foundation of Gansu (145RJZA087)

摘要/Abstract

摘要：

首先建立一类含不可微非线性项p-Laplacian方程的单侧全局区间分歧定理.应用上述定理，可以证明一类半线性p-Laplacian方程主半特征值的存在性.进而，可研究下列半线性p-Laplacian方程结点解的存在性

其中1< p <+∞，ψ_p（s）=|s|^p-2s，a（r）∈ C[0，1]，a（r）≥ 0且在[0，1]的任何子集上成立a（r）?0；λ是一个参数，u⁺=max{u，0}，u^-=-min{u，0}，α，β ∈ C[0，1]；对于s∈R⁺，都有f ∈ C（R，R）且sf（s）> 0，R⁺=[0，+∞），并且满足f₀ ∈[0，∞）且f_∞ ∈（0，∞）或者f₀∈（0，∞]且f_∞=0或者f₀=0且f_∞=∞，其中f₀=f（s）/s，f_∞=f（s）/s.该文用单侧全局分歧技巧和连通分支极限证明结论.

关键词: 单侧全局区间分歧, 半线性问题, 结点解, p-Laplacian方程

Abstract:

In this paper, we establish a unilateral global interval bifurcation result for the p-Laplacian equation. Furthermore, we shall prove the existence of the principal half-eigenvalues for the half-linear p-Laplacian equation. Moreover, we also investigate the existence of radial nodal solutions for the problems.
,
where 1< p < +∞, ψ_p(s)=|s|^p-2s, a(r) ∈ C[0, 1], a(r) ≥ 0,a(r)?0 on any subinterval of[0, 1]; λ is a parameter, u⁺=max{u, 0}, u^-=-min{u,0}, α, β ∈ C[0, 1] are radially symmetric; f ∈ C(R, R), sf(s) > 0 for s∈R⁺, and f₀ ∈[0, ∞) and f_∞ ∈ (0, ∞) or f₀ ∈ (0, ∞] and f_∞=0 or f₀=0 and f_∞=∞, where f₀= f(s)/s, f_∞=f(s)/s. We use unilateral global bifurcation techniques and the approximation of connected components to prove our main results.

Key words: Unilateral interval bifurcation, Half-quasilinear problems, Nodal solutions, p-Laplacian equation

中图分类号:

O175.8

沈文国. 一类p-Laplacian方程单侧全局区间分歧及应用[J]. 数学物理学报, 2018, 38(4): 770-778.

Shen Wenguo. Interval Bifurcation for the p-Laplacian Equation and Its Applications[J]. Acta mathematica scientia,Series A, 2018, 38(4): 770-778.

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