Szegő polynomial

In mathematics, a Szegő polynomial is one of a family of orthogonal polynomials for the Hermitian inner product

f | g = π π f ( e i θ ) g ( e i θ ) ¯ d μ {\displaystyle \langle f|g\rangle =\int _{-\pi }^{\pi }f(e^{i\theta }){\overline {g(e^{i\theta })}}\,d\mu }

where dμ is a given positive measure on [−π, π]. Writing ϕ n ( z ) {\displaystyle \phi _{n}(z)} for the polynomials, they obey a recurrence relation

ϕ n + 1 ( z ) = z ϕ n ( z ) + ρ n + 1 ϕ n ( z ) {\displaystyle \phi _{n+1}(z)=z\phi _{n}(z)+\rho _{n+1}\phi _{n}^{*}(z)}

where ρ n + 1 {\displaystyle \rho _{n+1}} is a parameter, called the reflection coefficient or the Szegő parameter.

See also

  • Cayley transform
  • Schur class
  • Favard's theorem

References

  • Bultheel, A. (2001) [1994], "Szegö polynomial", Encyclopedia of Mathematics, EMS Press
  • G. Szegő, "Orthogonal polynomials", Colloq. Publ., 33, Amer. Math. Soc. (1967)


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