Quasilinear problems with exponential growth in the reaction term

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References (18)

  • J. Garcia Azorero et al.

    On a Emden-Fowler type equation

    Nonlinear Analysis

    (1992)
  • E. Di Benedetto

    C1,α local regularity of weak solutions of degenerate elliptic equations

    Nonlinear Analysis

    (1983)
  • S. Chandrasekar

    An Introduction to the study of Stellar Structure

    (1985)
  • J.L. Kazdan et al.

    Curvature functions for compact 2-manifolds

    Ann. Math.

    (1974)
  • H. Fujita

    On the nonlinear equation δu + expu = 0 and vt = 7delta;u + expu

    Bull. Am. math. Soc.

    (1969)
  • M. Crandall et al.

    Bifurcation, perturbation of simple eigenvalues and linearized stability

    Archs ration. Mech. Analysis

    (1973)
  • M. Crandall et al.

    Some continuation and variational methods for positive solutions of nonlinear elliptic eigenvalue problems

    Archs ration. Mech. Analysis

    (1975)
  • C. Bandle

    Existence theorems. Qualitative results and a prior bounds for a class of nonlinear Dirichlet problems

    Archs ration. Mech. Analysis

    (1973)
  • I.M. Guelfand

    Some problems in the theory of quasilinear equations

    Am. math. Soc. Transl.

    (1963)
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Work part of the program of “Acciones integradas” between France and Spain, action number 119/1990.

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Authors partially supported by D.G.I.C.Y.T. (MEC, Spain) Project PB90-0218 and E.E.C. contract SC1- 0019-C(TT).

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