Meixner–Pollaczek polynomials

Template:Distinguish Template:More citations needed In mathematics, the Meixner–Pollaczek polynomials are a family of orthogonal polynomials PTemplate:Su(x,φ) introduced by Template:Harvs, which up to elementary changes of variables are the same as the Pollaczek polynomials PTemplate:Su(x,a,b) rediscovered by Template:Harvs in the case λ=1/2, and later generalized by him.

They are defined by

P_{n}^{(λ)} (x; ϕ) = \frac{(2 λ)_{n}}{n!} e^{i n ϕ}_{2} F_{1} (\begin{matrix} - n, λ + i x \\ 2 λ \end{matrix}; 1 - e^{- 2 i ϕ})

P_{n}^{λ} (\cos ϕ; a, b) = \frac{(2 λ)_{n}}{n!} e^{i n ϕ}_{2} F_{1} (\begin{matrix} - n, λ + i (a \cos ϕ + b) / \sin ϕ \\ 2 λ \end{matrix}; 1 - e^{- 2 i ϕ})

Examples

The first few Meixner–Pollaczek polynomials are

P_{0}^{(λ)} (x; ϕ) = 1

P_{1}^{(λ)} (x; ϕ) = 2 (λ \cos ϕ + x \sin ϕ)

P_{2}^{(λ)} (x; ϕ) = x^{2} + λ^{2} + (λ^{2} + λ - x^{2}) \cos (2 ϕ) + (1 + 2 λ) x \sin (2 ϕ) .

The Meixner–Pollaczek polynomials P_m^(λ)(x;φ) are orthogonal on the real line with respect to the weight function

w (x; λ, ϕ) = | Γ (λ + i x) |^{2} e^{(2 ϕ - π) x}

and the orthogonality relation is given by^[1]

\int_{- \infty}^{\infty} P_{n}^{(λ)} (x; ϕ) P_{m}^{(λ)} (x; ϕ) w (x; λ, ϕ) d x = \frac{2 π Γ (n + 2 λ)}{(2 \sin ϕ)^{2 λ} n!} δ_{m n}, λ > 0, 0 < ϕ < π .

The sequence of Meixner–Pollaczek polynomials satisfies the recurrence relation^[2]

(n + 1) P_{n + 1}^{(λ)} (x; ϕ) = 2 (x \sin ϕ + (n + λ) \cos ϕ) P_{n}^{(λ)} (x; ϕ) - (n + 2 λ - 1) P_{n - 1} (x; ϕ) .

The Meixner–Pollaczek polynomials are given by the Rodrigues-like formula^[3]

P_{n}^{(λ)} (x; ϕ) = \frac{(- 1)^{n}}{n! w (x; λ, ϕ)} \frac{d^{n}}{d x^{n}} w (x; λ + \frac{1}{2} n, ϕ),

where w(x;λ,φ) is the weight function given above.

The Meixner–Pollaczek polynomials have the generating function^[4]

\sum_{n = 0}^{\infty} t^{n} P_{n}^{(λ)} (x; ϕ) = (1 - e^{i ϕ} t)^{- λ + i x} (1 - e^{- i ϕ} t)^{- λ - i x} .