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[1]Alves C O,Morrais Filho D C de, Souto M A S. On the systems of elliptic equations involving subcriticalSobolev exponents.Nonlinear Anal,2000,42: 711-787
[2]Boccardo L, Murat F. Almost everywhere convergence of the gradients of solutions to elliptic and parapolic equations. Nonlinear Anal, 1992, 19: 581-597
[3]Caffarelli L, Kohn R, Nirenberg L. First order interpolation inequalities with weights. Compositio Math,1984, 53: 259-275
[4]Caldiroli P, Musina R. On the existence of extremal functions for a weighted Sobolev embedding with critical exponent. Calc Var, 1999, 8: 365-387
[5]Caldiroli P, Musina R. On a variational degenerate elliptic problem. NoDEA, 2000, 7: 187-199
[6]Catrina F, Wang Z Q. On the Caffarelli-Kohn-Nirenberg inequalities: sharp constants, existence (and nonexistence) and symmetry of extremal functions. Comm on Pure and Applied Math, 2001, 54: 229-258
[7]Chabrowski J,Yang J. On the Neumann problem for an elliptic system of equations involving the Sobolev exponent.Colloquium Mathematicum,2001,90(1): 19-35
[8]Chang K C. Critical point theory and its applications. Shanghai: Shanghai Sci & Tech. Press, 1986 (in Chinese)
[9]Chou K S, Chu W S. On the best constant for a weighted Sobolev-Hardy inequality. J London Math Soc,1993, 48: 137-151
[10]Dautray R, Lions J -L. Mathematical analysis and numerical methods for science and technology. Berlin:Springer-Verlag, 1985, 1
[11]Evans L C. Weak convergence methods for nonlinear partial differetial equations. Conference Board of the Mathematical Sciences, 1988
[12]Evans L C, Gaiepy R F. Measure theorey and fine properties of functions. CRC Press, 1992
[13]Garcia Azorero J P, Peral Alonso I. Hardy inequalities and some critical elliptic and parabolic problems.J Diff Eq. 1998, 144: 441-476
[14]Ghoussoub N, Yuan C. Multiple solution for quasi-linear PDEs involving the critical sobolev and Hardy exponents. Trans A M S, 2000, 352: 5703-5743
[15] Li G, Zhou H. The existence of a positive solution to asymptically linear scalar field equations. Proc Royal Soc Edinburgh, 2000, 130A: 81-105
[16]Lieb E H.Sharp constants in the Hardy-Littlewood-Sobolev inequality and related inequalities. Ann of Math, 1983, 118: 349-374
[17]Lions P L.The concentration-compactness principle in the calculus of variations.The limit case I & II.Rev Mat Iberoamericana,1985,1: 145-201; 2: 45-121
[18]Smets D. A concentration compactness lemma with applications to singular eigenvalue problems. J FunctAnal, 1999, 167: 463-480
[19]Struwe M. Variational methods. Berlin: Springer-Verlag, 1996
[20]Talenti G. Best constants in Sobolev inequality. Annali Mat Pura Appl, 1976, 110: 353-372
[21]Wang Z Q, Willem M. Singular minimization problems. J Diff Eq, 2000, 161: 307-320
[22]Willem M. Minimax theorem. Boston: Birkhauser, 1996
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