Solutions of a nonlinear Dirichlet problem in which the nonlinear part is bounded from above and below by polynomials

    Jan Beczek Info

Abstract

In this paper we study the existence and multiplicity solutions of nonlinear elliptic problem of the form

 

Here Ω is a smooth and bounded domain in RN N ≥ 2, λ ∈ R and f : R → R is a continuous, even function satisfying the following condition

 

for some c 1c 2c 3p, α ∈ Rc 1c 2c 3, α > 0 and p > 1+ α.  We shall show that, for λ ∈ Rg ∈ Lr (Ω) if N = 2, r > 1, p > 1 + α or  the above problem has solutions. Assuming additionally that, λ ≤ λ1 and f is decreasing for t ≤ 0, we shall show that, this problem have exctly one solution. We take advantage of the fact, that a continuous, proper and odd (injective) map of the form I + C (where C is compact) is suriective (a homeomorphism).

First Published Online: 14 Oct 2010

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How to Cite

Beczek, J. (1997). Solutions of a nonlinear Dirichlet problem in which the nonlinear part is bounded from above and below by polynomials. Mathematical Modelling and Analysis, 2(1), 35-40. https://doi.org/10.3846/13926292.1997.9637064

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December 15, 1997
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1997-12-15

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How to Cite

Beczek, J. (1997). Solutions of a nonlinear Dirichlet problem in which the nonlinear part is bounded from above and below by polynomials. Mathematical Modelling and Analysis, 2(1), 35-40. https://doi.org/10.3846/13926292.1997.9637064

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