EXISTENCE RESULTS FOR DEGENERATE ELLIPTIC EQUATIONS WITH CRITICAL CONE SOBOLEV EXPONENTS

doi:10.1016/S0252-9602(14)60134-X

数学物理学报(英文版) ›› 2014, Vol. 34 ›› Issue (6): 1907-1921.doi: 10.1016/S0252-9602(14)60134-X

EXISTENCE RESULTS FOR DEGENERATE ELLIPTIC EQUATIONS WITH CRITICAL CONE SOBOLEV EXPONENTS

范海宁*|刘晓春

School of Sciences, China University of Mining and Technology, Xuzhou 221116, China；Department of Mathematics, Wuhan University, Wuhan 430072, China； Department of Mathematics, Wuhan University, Wuhan 430072, China

收稿日期:2013-04-23 修回日期:2013-10-30 出版日期:2014-11-20 发布日期:2014-11-20
通讯作者: 范海宁，fanhaining888@163.com E-mail:fanhaining888@163.com；xcliu@whu.edu.cn
基金资助:
This work was supported by NSFC (11371282).

EXISTENCE RESULTS FOR DEGENERATE ELLIPTIC EQUATIONS WITH CRITICAL CONE SOBOLEV EXPONENTS

FAN Hai-Ning*, LIU Xiao-Chun

School of Sciences, China University of Mining and Technology, Xuzhou 221116, China；Department of Mathematics, Wuhan University, Wuhan 430072, China； Department of Mathematics, Wuhan University, Wuhan 430072, China

Received:2013-04-23 Revised:2013-10-30 Online:2014-11-20 Published:2014-11-20
Contact: FAN Hai-Ning，fanhaining888@163.com E-mail:fanhaining888@163.com；xcliu@whu.edu.cn
Supported by:
This work was supported by NSFC (11371282).

摘要/Abstract

摘要：

In this paper, we study the existence result for degenerate elliptic equations with singular potential and critical cone sobolev exponents on singular manifolds. With the help of the variational method and the theory of genus, we obtain several results under different conditions.

关键词: existence results, variational method, critical cone Sobolev exponent, singular potential

Abstract:

Key words: existence results, variational method, critical cone Sobolev exponent, singular potential

中图分类号:

35J20

范海宁, 刘晓春. EXISTENCE RESULTS FOR DEGENERATE ELLIPTIC EQUATIONS WITH CRITICAL CONE SOBOLEV EXPONENTS[J]. 数学物理学报(英文版), 2014, 34(6): 1907-1921.

FAN Hai-Ning, LIU Xiao-Chun. EXISTENCE RESULTS FOR DEGENERATE ELLIPTIC EQUATIONS WITH CRITICAL CONE SOBOLEV EXPONENTS[J]. Acta mathematica scientia,Series B, 2014, 34(6): 1907-1921.

参考文献

[1] Ambrosetti A, Brezis H, Cerami G. Combined effects of concave and convex nonlinearities in some elliptic problems. J Funct Anal, 1994, 122: 519–543

[2] Chen H, Liu X, Wei Y. Existence theorem for a class of semilinear elliptic equations with critical cone Sobolev exponent. Ann Glob Anal Geom, 2011, 39: 27–43

[3] Chen H, Liu X, Wei Y. Cone Sobolev inequality and Dirichlet problem for nonlinear elliptic equations on a manifold with conical singularities. Cal Var Partial Differ, 2012, 43: 463–484

[4] Chen H, Liu X, Wei Y. Multiple solutions for semilinear totally characteristic equations with subcritical or critical cone sobolev exponents. J Differ Equ, 2012, 252: 4200–4228

[5] Chen H, Liu X, Wei Y. Dirichlet problem for semilinear edge-degenerate elliptic equations with singular potential term. J Differ Equ, 2012, 252: 4289–4314

[6] Chen H, Wei Y, Zhou B. Existence of solutions for degenerate elliptic equations with singular potential on singular manifolds. Math Nachrichten, 2012, 285: 1370–1384

[7] Egorov Ju V, Schulze B -W. Pseudo-Differential Operators, Singularities, Applications. Operator Theory, Advances and Applications 93. Basel: Birkh¨auser Verlag, 1997

[8] Fan H, Liu X. Multiple positive solutions for degenerate elliptic equations with critical cone Sobolev exponents on singular manifolds. Elec J Diff Equ, 2013, 2013: 1–22

[9] Fan H. Existence theorems for a class of edge-degenerate elliptic equations on singular manifolds. Proceedings of the Edinburgh Mathematical Society, in press

[10] Garcia J, Peral I. Multiplicity of solutions for elliptic problems with critical exponent or with a nonsymmetric term. Trans Amer Math Soc, 1991, 323: 941–957

[11] Kondrat’ev V A. Bundary value problems for elliptic equations in domains with conical points. Tr Mosk Mat Obs, 1967, 16: 209–292

[12] Liu X, Yuan M. Existence of nodal solution for semi-linear elliptic equations with critical Sobolev exponent on singular manifold. Acta Math Sci, 2013, 33B(2): 543–555

[13] Lions P L. The concentration-compactness principle in the calculus of variations, the locally comapct case. Ann Inst H Poincare Anal Nonlineaire, 1984, 1(Part 1): 109–145; 1984, 2(Part 2): 223–283

[14] Lions P L. The concentration-compactness principle in the calculus of variations: the limit case. Rev Mat Ibero Americana, 1985, 1(Part 1): 145–201; 1985, 2(Part 2): 45–121

[15] Mazzeo R. Elliptic theory of differential edge operators I. Comm Partial Differ Equ, 1991, 16: 1615–1664

[16] Melrose R B, Mendoza G A. Elliptic operators of totally characteristic type. PreprintMath Sci Res Institute, MSRI, 1983: 47–83

[17] Melrose R B, Piazza P. Analytic K-theory on manifolds with cornners. Adv Math, 1992, 92: 1–26

[18] Ouyang T, Shi J. Exact multiplicity of positive solutions for a class of semilinear problem II. J Differ Equ, 1999, 158: 94–151

[19] Schulze B -W. Boundary Value Problems and Singular Pseudo-Differential Operators. Chichester: John Wiley, 1998

[20] Schrohe E, Seiler J. Ellipticity and invertiblity in the cone algebra on L p-Sobolev spaces. Integral Equations Operator Theory, 2001, 41: 93–114

[21] Struwe M. Variational Methods, 2nd ed. Berlin, Heidelberg: Springer-Verlag, 1996

[22] Tang M. Exact multiplicity for semilinear elliptic Dirichlet problems involving concave and convex nonlinearities. Proc Royal Soc Edinburgh, 2003, 133A: 705–717

[23] Willem W. Minimax Theorems. Birkhauser, 1996

EXISTENCE RESULTS FOR DEGENERATE ELLIPTIC EQUATIONS WITH CRITICAL CONE SOBOLEV EXPONENTS

EXISTENCE RESULTS FOR DEGENERATE ELLIPTIC EQUATIONS WITH CRITICAL CONE SOBOLEV EXPONENTS

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