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SINGULAR LIMITS FOR 2-DIMENSIONAL ELLIPTIC PROBLEMS INVOLVING EXPONENTIAL NONLINEARITIES WITH SUB-QUADRATIC CONVECTION TERM

Published online by Cambridge University Press:  25 February 2013

SAMI BARAKET
Affiliation:
Department of Mathematics, College of Science King Saud University, P.O. Box 2455, Riyadh 11451, Saudi Arabia e-mail: [email protected]
TAIEB OUNI
Affiliation:
Département de Mathématiques, Faculté des Sciences de TunisCampus Universitaire, 2092 Tunis, Tunisia e-mail: [email protected]
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Abstract

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Let Ω be a bounded domain with smooth boundary in ℝ2, q∈[1,2) and x1, x2,. . .,xm ∈ Ω. In this paper we are concerned with the following type of problem:

\[ -\Delta u-\lambda|\nabla u|^q = \rho^{2}e^{u}, \]
with u = 0 on ∂ Ω. We use some nonlinear domain decomposition method to construct a positive weak solution vρ,λ in Ω, which tends to a singular function at each xi as the parameters ρ and λ tend to 0 independently.

Keywords

Type
Research Article
Copyright
Copyright © Glasgow Mathematical Journal Trust 2013 

References

REFERENCES

1.Bandle, C. and Giarrusso, E., Boundary blowup for semilinear elliptic equations with nonlinear gradient terms, Adv. Differ. Equ. 1 (1996), 133150.Google Scholar
2.Baraket, S., Ben Omrane, I. and Ouni, T., Singular limits for 2-dimensional elliptic problem involving exponential with nonlinear gradient term. Nonlinear Differ. Equ. Appl. 18 (2011), 5978.CrossRefGoogle Scholar
3.Baraket, S., Ben Omrane, I., Ouni, T. and Trabelsi, N., Singular limits for 2-dimensional elliptic problem with exponentially dominated nonlinearity and singular data. Commun. Contemp. Math. 13 (4) (2011), 129.Google Scholar
4.Baraket, S. and Pacard, F., Construction of singular limits for a semilinear elliptic equation in dimension 2, Calc. Var. Partial Differ. Equ. 6 (1998), 138.Google Scholar
5.Del Pino, M., Kowalczyk, M. and Musso, M., Singular limits in Liouville type equations, Calc. Var. Partial Differ. Equ. 24 (2005), 4781.CrossRefGoogle Scholar
6.Esposito, P., Grossi, M. and Pistoia, A., On the existence of blowing-up solutions for a mean field equation, Ann. I. H. Poincaré 22 (2005), 227257.Google Scholar
7.Esposito, P., Musso, M. and Pistoia, A., Concentrating solutions for a planar problem involving nonlinearities with large exponent, J. Differ. Equ. 227 (2006), 2968.Google Scholar
8.Ghergu, M. and Radulescu, V., On the influence of a subquadratic term in singular elliptic problems, in Applied analysis and differential equations (Carja, O. and Vrabie, I., Editors) (World Scientific, Singapore, 2007), 127138.Google Scholar
9.Giarrusso, E., Asymptotic behavior of large solutions of an elliptic quasilinear equation with a borderline case, C. R. Acad. Sci. Paris, Ser. I. 331 (2000), 777782.Google Scholar
10.Giarrusso, E., On blow up solutions of a quasilinear elliptic equation, Math. Nachr. 213 (2000), 89104.Google Scholar
11.Greco, A. and Porru, G., Asymptotic estimates and convexity of large solutions to semilinear elliptic equations, Differ. Integral Equ. 10 (1997), 219229.Google Scholar
12.Kristëly, A., Radulescu, V. and Varga, C., Variational principles in mathematical physics, geometry, and economics: Qualitative analysis of nonlinear equations and unilateral problems, encyclopedia of mathematics and its applications, vol. 136 (Cambridge University Press, Cambridge, UK, 2010).CrossRefGoogle Scholar
13.Liouville, J., Sur l'équation aux différences partielles $\partial^{2}\log\frac{\lambda}{\partial u \partial v}\pm\frac{\lambda}{2a^{2}} = 0 $, J. Math. 18 (1853), 1772.Google Scholar
14.Marcus, M. and Véron, L., Uniqueness of solutions with blowup on the boundary for a class of nonlinear elliptic equations, C. R. Acad. Sci. Paris, Ser. I. 317 (1993), 557563.Google Scholar
15.Osserman, R., On the inequality Δuf(u), Pacific J. Math. 7 (1957), 16411647.Google Scholar
16.Rébai, Y., Weak solutions of nonlinear elliptic with prescribed singular set, J. Differ. Equ. 127 (2) (1996), 439453.Google Scholar
17.Ren, X. and Wei, J., On a two-dimensional elliptic problem with large exponent in nonlinearity, Trans. Am. Math. Soc. 343 (1994), 749763.CrossRefGoogle Scholar
18.Suzuki, T., Two dimensional Emden–Fowler equation with exponential nonlinearity, in Nonlinear diffusion equations and their equilibrium states 3 (Birkäuser, Berlin, Germany, 1992), 493512.CrossRefGoogle Scholar
19.Tao, S. and Zhang, Z., On the existence of explosive solutions for semilinear elliptic problems, Nonlinear Anal. 48 (2002), 10431050.Google Scholar
20.Tarantello, G., On Chern-Simons theory, in Nonlinear PDE's and physical modeling: Superfluidity, superconductivity and reactive flows (Berestycki, H. editor) (Kluver, Dordrecht, Netherlands, 2002), 507526.Google Scholar
21.Wei, J., Ye, D. and Zhou, F., Bubbling solutions for an anisotropic Emden-Fowler equation, Calc. Var. Partial Differ. Equ. 28 (2) (2007), 217247.CrossRefGoogle Scholar
22.Weston, V. H., On the asymptotique solution of a partial differential equation with exponential nonlinearity, SIAM J. Math. 9 (1978), 10301053.CrossRefGoogle Scholar
23.Wong, J. S. W., On the generalized Emden-Fowler equation, SIAM Rev. 17 (1975), 339360.CrossRefGoogle Scholar
24.Zhang, Z. and Tao, S., On the existence and asymptotic behaviour of explosive solutions for semilinear elliptic problems, Acta Math. Sin. 45A (2002), 493700 (in Chinese).Google Scholar
25.Zhao, C., Blowing-up solutions to an anistropic Emden-Fowler equation with a singular source, J. Math. Anal. Appl. 342 (2008), 398422.CrossRefGoogle Scholar