On the characterization of the Dirichlet and Fucik spectra for the one-dimensional asymmetric p-Laplace operator

The paper is concerned with the Dirichlet spectrum $\Lambda^{a,b}_p(0,L)$ of the asymmetric $p$-Laplace operator $- \Delta^{a,b}_{p}$ on an interval $(0,L)$ where \[ \Delta^{a,b}_p u:= \left(a^{p}[(u')^{+}]^{p-1}-b^{p}[(u')^{-}]^{p-1}\right)'. \] We characterize completely the set $\Lambda^{a,b}_p(0,L)$ and the respective eigenfunctions in terms of the corresponding ones for the classical one-dimensional $p$-Laplace operator and establish that only the eigenfunctions associated to the first Dirichlet eigenvalue of $- \Delta^{a,b}_{p}$ on $(0,L)$ have definite sign and, furthermore, its eigenspace is formed precisely by two non-collinear half-lines in $C^1[0,L]$ if and only if $a \neq b$. Our approach also allows to characterize the Fu\v c\'ik spectrum $\Sigma^{a,b}_p(0,L)$ of $- \Delta^{a,b}_{p}$ on $(0,L)$ from a disjoint enumerate union of hyperboles closely related to the classical counterpart and corresponding solutions. All results are novelty even for $p = 2$.
Comment: 17 pages, comments are welcome