Abstract
This paper provides a method to bound and calculate any eigenvalues and eigenfunctions of n-th order boundary value problems with sign-regular kernels subject to two-point boundary conditions. The method is based on the selection of a particular type of cone for each eigenpair to be determined, the recursive application of the operator associated to the equivalent integral problem to functions belonging to such a cone, and the calculation of the Collatz–Wielandt numbers of the resulting functions.
Subject
General Mathematics,Engineering (miscellaneous),Computer Science (miscellaneous)
Reference36 articles.
1. One-dimensional boundary-value problems with operators that do not decrease the number of sign chances;Levin;Uspekhi Mat. Nauk.,1975
2. Total Positivity;Karlin,1968
3. Effective criteria for the strong sign-regularity and the oscillation property of the Green's functions of two-point boundary-value problems
4. Oscillation Matrices and Kernels and Small Vibrations of Mechanical Systems
5. Stability of Fluid Motions I;Joseph,1976
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