W. N. Everitt scite author profile

The SLEIGN2 code is based on the ideas and methods of the original SLEIGN code of 1979. The main purpose of the SLEIGN2 code is to compute eigenvalues and eigenfunctions of regular and singular self-adjoint Sturm-Liouville problems, with both separated and coupled boundary conditions, and to approximate the continuous spectrum in the singular case. The code uses some new algorithms, which we describe, and has a driver program that offers a user-friendly interface. In this paper the algorithms and their implementations are discussed, and the class of problems to which each algorithm applied is identified.

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Boundary Value Problems and Symplectic Algebra for Ordinary Differential and Quasi-differential Operators

Everitt

Markus

1998

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Regular approximations of singular Sturm-Liouville problems

et al. 1993

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Given any self-adjoint realization S of a singular Sturm-Liouville (S-L) problem, it is possible to construct a sequence {S r } of regular S-L problems with the properties (i) every point of the spectrum of S is the limit of a sequence of eigenvalues from the spectrum of the individual members of {S r } (ii) in the case when S is regular or limit-circle at each endpoint, a convergent sequence of eigenvalues from the individual members of {S r } has to converge to an eigenvalue of S (iii) in the general case when S is bounded below, property (ii) holds for all eigenvalues below the essential spectrum of S.

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Jacobi–Stirling numbers, Jacobi polynomials, and the left-definite analysis of the classical Jacobi differential expression

Everitt

Kwon

Littlejohn

et al. 2007

Journal of Computational and Applied Mathematics

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We develop the left-definite analysis associated with the self-adjoint Jacobi operator A ( , ) k , generated from the classical secondorder Jacobi differential expressionin the Hilbert space L 2 , (−1, 1) := L 2 ((−1, 1); w , (t)), where w , (t) = (1 − t) (1 + t) , that has the Jacobi polynomials {P ( , ) m } ∞ m=0 as eigenfunctions; here, , > − 1 and k is a fixed, non-negative constant. More specifically, for each n ∈ N, we explicitly determine the unique left-definite Hilbert-Sobolev space W ( , ) n,k (−1, 1) and the corresponding unique left-definite selfadjoint operator B ( , )

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VII.—On the Spectrum of Ordinary Second Order Differential Operators.

Chaudhuri¹,

Everitt²

1969

Proc. Sect. A, Math. phys. sci.

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SynopsisThis paper considers properties of the spectrum of differential operators derived from differential expressions of the second order. The object is to link the spectral properties of these differential operators with the analytic, function-theoretic properties of the solutions of the differential equation. This provides an alternative approach to the spectral theory of these differential operators but one which is consistent with the standard definitions used in Hilbert space theory. In this way the approach may be of interest to applied mathematicians and theoretical physicists.

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W. N. Everitt

Algorithm 810: The SLEIGN2 Sturm-Liouville Code

Boundary Value Problems and Symplectic Algebra for Ordinary Differential and Quasi-differential Operators

Regular approximations of singular Sturm-Liouville problems

Jacobi–Stirling numbers, Jacobi polynomials, and the left-definite analysis of the classical Jacobi differential expression

VII.—On the Spectrum of Ordinary Second Order Differential Operators.

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