The Legendre–Stirling numbers are the coefficients in the integral Lagrangian symmetric powers of the classical Legendre second-order differential ...

The Legendre-Stirling numbers were discovered in 2002 as a result of a problem in- volving the spectral theory of powers of the classical second-order Legendre ...

Oct 22, 2024 · The Legendre–Stirling numbers are the coefficients in the integral Lagrangian symmetric powers of the classical Legendre second-order ...

[1] Legendre polynomials, Legendre-Stirling numbers, and the left-definite spectral analysis of the Legendre differential expression (with W. N. Everitt and ...

The Legendre-Stirling numbers are the coeffi cients in the integral Lagrangian sym- metric powers of the classical Legendre second-order differential expression ...

The Legendre-Stirling numbers were discovered by Everitt, Littlejohn and Wellman in 2002 in a study of the spectral theory of powers of the classical ...

These Legendre–Stirling numbers {PSn(j)} are the analogues of the classical Stirling numbers of the second kind {Sn(j)} (see [1, pp. 824–825], [4, Chapter V]), ...

Dec 21, 2018 · The Legendre-Stirling numbers of the second kind were introduced by Everitt et al. in the spectral theory of powers of the Legendre differential ...

The Legendre-Stirling numbers are the coefficients in the integral Lagrangian symmetric powers of the classical Legendre second-order differential ...

The Legendre-Stirling numbers are the coe¢ cients in the integral Lagrangian symmetric powers of the classical Legendre second-order di¤erential expression.