Abstract
AbstractWe exhibit three examples showing that the “time-and-band limiting” commutative property found and exploited by D. Slepian, H. Landau and H. Pollak at Bell Labs in the 1960s, and independently by M. Mehta and later by C. Tracy and H. Widom in Random matrix theory, holds for exceptional orthogonal polynomials. The property in question is the existence of local operators with simple spectrum that commute with naturally appearing global ones. We illustrate numerically the advantage of having such a local operator.
Funder
Ministerio de Ciencia e Innovación
Consejería de Economía, Conocimiento, Empresas y Universidad, Junta de Andalucía
Publisher
Springer Science and Business Media LLC