In this paper we present a new variational characteriztion of the first nontrival curve of the Fucik spectrum for elliptic operators with Dirichlet boundary conditions. Moreover, we describe the asymptotic behaviour and some properties of this curve and of the corresponding eigenfunctions. In particular, this new characterization allows us to compare the first curve of the Fucik spectrum with the infinitely many curves we obtained in previous works; for example, we show that these curves are all asymptotic to the same lines as the first curve, but they are all distinct from such a curve.
Molle, R., Passaseo, D. (2015). Variational properties of the first curve of the Fučík spectrum for elliptic operators. CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS, 54(4), 3735-3752 [10.1007/s00526-015-0920-4].
Variational properties of the first curve of the Fučík spectrum for elliptic operators
Molle R.
;
2015-12-01
Abstract
In this paper we present a new variational characteriztion of the first nontrival curve of the Fucik spectrum for elliptic operators with Dirichlet boundary conditions. Moreover, we describe the asymptotic behaviour and some properties of this curve and of the corresponding eigenfunctions. In particular, this new characterization allows us to compare the first curve of the Fucik spectrum with the infinitely many curves we obtained in previous works; for example, we show that these curves are all asymptotic to the same lines as the first curve, but they are all distinct from such a curve.File | Dimensione | Formato | |
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