论文信息 - Random Sturm-Liouville operators

Random Sturm-Liouville operators

Selfadjoint Sturm-Liouville operators $H_\omega$ on $L_2(a,b)$ with random potentials are considered and it is proven, using positivity conditions, that for almost every $\omega$ the operator $H_\omega$ does not share eigenvalues with a broad family of random operators and in particular with operators generated in the same way as $H_\omega$ but in $L_2(\tilde a,\tilde b)$ where $(\tilde a,\tilde b)\subset(a,b)$.

Rafael del Rio | R. Rio

[1] G. Teschl. ON THE APPROXIMATION OF ISOLATED EIGENVALUES OF ORDINARY DIFFERENTIAL OPERATORS , 2006, math/0612622.

[2] Embedded Eigenvalues of Sturm Liouville Operators , 1991 .

[3] Abel Klein,et al. Random Schrödinger operators , 2008 .

[4] M. Eisen,et al. Probability and its applications , 1975 .

[5] Spectral measures of Jacobi operators with random potentials , 2009, 0907.1934.

[6] R. Carmona,et al. Spectral Theory of Random Schrödinger Operators , 1990 .

[7] I. M. Glazman,et al. Theory of linear operators in Hilbert space , 1961 .

[8] K. Brown,et al. Graduate Texts in Mathematics , 1982 .

[9] D. Pearson,et al. Quantum scattering and spectral theory , 1988 .

[10] Hans L. Cycon,et al. Schrodinger Operators: With Application to Quantum Mechanics and Global Geometry , 1987 .

[11] N. H. March. Techniques of Physics , 1993 .

[12] F. V. Atkinson,et al. Discrete and Continuous Boundary Problems , 1964 .

[13] A. Kechris,et al. Measurable enumeration of eigenelements , 1998 .