Basis properties of eigenfunctions of nonlinear Sturm-Liouville problems
Electronic journal of differential equations, Tome 2000 (2000)
We consider three nonlinear eigenvalue problems that consist of $-y''+f(y^2)y=\lambda y$ with one of the following boundary conditions: $y(0)=y(1)=0$ y'$(0)=p$, y'$(0)=y(1)=0 y(0)=p$, y'$(0)=y'(1)=0 y(0)=p$, where p is a positive constant. Under smoothness and monotonicity conditions on f, we show the existence and uniqueness of a sequence of eigenvalues $\{\lambda _n\}$ and corresponding eigenfunctions $\{y_n\}$ such that $y_n(x)$ has precisely n roots in the interval (0,1), where n=0,1,2,$\dots $. For the first boundary condition, we show that $\{y_n\}$ is a basis and that $\{y_n/\|y_n\|\}$ is a Riesz basis in the space $L_2(0,1)$. For the second and third boundary conditions, we show that $\{y_n\}$ is a Riesz basis.
Classification :
34L10, 34L30, 34L99
Keywords: Riesz basis, nonlinear eigenvalue problem, Sturm-Liouville operator, completeness, basis
Keywords: Riesz basis, nonlinear eigenvalue problem, Sturm-Liouville operator, completeness, basis
@article{EJDE_2000__2000__a27,
author = {Zhidkov, P.E.},
title = {Basis properties of eigenfunctions of nonlinear {Sturm-Liouville} problems},
journal = {Electronic journal of differential equations},
year = {2000},
volume = {2000},
zbl = {0945.34066},
language = {en},
url = {http://geodesic.mathdoc.fr/item/EJDE_2000__2000__a27/}
}
Zhidkov, P.E. Basis properties of eigenfunctions of nonlinear Sturm-Liouville problems. Electronic journal of differential equations, Tome 2000 (2000). http://geodesic.mathdoc.fr/item/EJDE_2000__2000__a27/