呂秋燕,劉文斌,唐　敏*,申騰飛,程玲玲

(1.蘇州市吳中區(qū)東山中學(xué)，中國 蘇州　215107；2.中國礦業(yè)大學(xué)理學(xué)院，中國 徐州　221116)

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帶p-Laplacian算子的分數(shù)階微分方程多點邊值問題的解的存在性

呂秋燕1,劉文斌2,唐敏2*,申騰飛2,程玲玲2

(1.蘇州市吳中區(qū)東山中學(xué)，中國 蘇州215107；2.中國礦業(yè)大學(xué)理學(xué)院，中國 徐州221116)

摘要利用不動點定理,研究帶有p-Laplacian算子的分數(shù)階微分方程多點邊值問題解的存在性,得到邊值問題至少存在一個解的充分條件.

關(guān)鍵詞分數(shù)階微分方程;p-Laplacian算子;存在性;不動點定理

Exitence of Solutions for Fractions Multi-point Boundary Value Problem withp-Laplacian Operator

LVQiu-yan1,LIUWen-bin2*,TANGMin2,SHENTeng-fei2,CHENGLing-ling2

(1.Dongshan High School, Suzhou 215107, China;2.College of Science, China University of Mining and Technology, Xuzhou 221116, China)

AbstractThis paper presents a study on the existence of solutions for the fractional multi-point boundary value problem withp-Laplacian operator. Making use of the fixed-point theorem, we obtained sufficient conditions to guarantee the existence of at least one solution for the boundary value problem.

Key wordsfractional differential equation;p-Laplacian operator; existence; fixed point theorem

近年來,分數(shù)階微分方程被廣泛應(yīng)用于物理學(xué)、生物學(xué)、控制論等諸多領(lǐng)域[1-3],因此,分數(shù)階微分方程受到許多學(xué)者的廣泛關(guān)注，并取得了很多有意義的結(jié)果.文獻[4]研究了分數(shù)階微分方程三點邊值問題

解的存在性,其中1<α≤2,0≤β≤1.

為了研究流體力學(xué)中相關(guān)問題,文獻[5]介紹了一類帶有p-Laplacian算子的微分方程,其一維形式如下

(φp(x′(t)))′=f(t,x(t),x′(t)),

(1)

文獻[13]研究了下面分數(shù)階微分方程反周期邊值問題

受以上文獻的啟示,我們研究如下一類帶有p-Laplacian算子分數(shù)階微分方程多點邊值問題解的存在性，

(2)

1基本定義和預(yù)備知識

顯然,E是Banach空間.

定義1.1[14]函數(shù)u:(0,∞)→R的α>0階Riemann-Liouville型積分是指

其中右邊在(0,∞)上逐點定義.

定義1.2[14]函數(shù)u:(0,∞)→R的α>0階Caputo型微分是指

其中n為大于或等于α的最小整數(shù),右邊是在(0,∞)上逐點定義的.

引理1.1[14]設(shè)函數(shù)u∈C(0,1)有α>0階的Caputo型微分,則

其中n是大于或等于α的最小整數(shù).

引理1.3設(shè)g(t)∈C[0,1]，

(3)

2主要結(jié)論

引理2.1算子F:E→E是全連續(xù)的.

定理2.1對任意的常數(shù)r>0,Ω={u|‖u‖

(H)|f(t,u,v,w)|≤σφp(mr),

因此得到

由引理1.2知F滿足Rothe條件,原方程至少存在一個解.

3例子

例3.1考慮如下帶有p-Laplacian算子的分數(shù)階微分方程多點邊值問題

(4)

不妨設(shè)r=6,則有界集Ω={u‖|u‖E<6,u∈E}.

顯然,問題(4)滿足定理2.1的假設(shè)條件.因此,至少存在一個解.

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(編輯HWJ)

中圖分類號O175.8

文獻標識碼A

文章編號1000-2537(2016)01-0080-05

*通訊作者,E-mail：wblium@163.com

基金項目：國家自然科學(xué)基金資助項目(11271364)

收稿日期：2013-12-02

DOI:10.7612/j.issn.1000-2537.2016.01.014