Plancherel–Rotach Asymptotics
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The Plancherel–Rotach asymptotics are
asymptotic In analytic geometry, an asymptote () of a curve is a line such that the distance between the curve and the line approaches zero as one or both of the ''x'' or ''y'' coordinates Limit of a function#Limits at infinity, tends to infinity. In pro ...
results for
orthogonal polynomials In mathematics, an orthogonal polynomial sequence is a family of polynomials such that any two different polynomials in the sequence are orthogonal In mathematics, orthogonality (mathematics), orthogonality is the generalization of the geom ...
. They are named after the
Swiss Swiss most commonly refers to: * the adjectival form of Switzerland * Swiss people Swiss may also refer to: Places * Swiss, Missouri * Swiss, North Carolina * Swiss, West Virginia * Swiss, Wisconsin Other uses * Swiss Café, an old café located ...
mathematicians
Michel Plancherel Michel Plancherel (; 16 January 1885 – 4 March 1967) was a Swiss people, Swiss mathematician. Biography He was born in Bussy, Fribourg, Bussy (Canton of Fribourg, Switzerland) and obtained his Diplom in mathematics from the University of Fribou ...
and his
PhD A Doctor of Philosophy (PhD, DPhil; or ) is a terminal degree that usually denotes the highest level of academic achievement in a given discipline and is awarded following a course of graduate study and original research. The name of the deg ...
student Walter Rotach, who first derived the asymptotics for the
Hermite polynomial In mathematics, the Hermite polynomials are a classical orthogonal polynomial sequence. The polynomials arise in: * signal processing as Hermitian wavelets for wavelet transform analysis * probability, such as the Edgeworth series, as well a ...
and
Laguerre polynomial In mathematics, the Laguerre polynomials, named after Edmond Laguerre (1834–1886), are nontrivial solutions of Laguerre's differential equation: xy'' + (1 - x)y' + ny = 0,\ y = y(x) which is a second-order linear differential equation. Thi ...
. Nowadays asymptotic expansions of this kind for orthogonal polynomials are referred to as ''Plancherel–Rotach asymptotics'' or of ''Plancherel–Rotach type''. The case for the associated Laguerre polynomial was derived by the Swiss mathematician Egon Möcklin, another PhD student of Plancherel and
George Pólya George Pólya (; ; December 13, 1887 – September 7, 1985) was a Hungarian-American mathematician. He was a professor of mathematics from 1914 to 1940 at ETH Zürich and from 1940 to 1953 at Stanford University. He made fundamental contributi ...
at
ETH Zurich ETH Zurich (; ) is a public university in Zurich, Switzerland. Founded in 1854 with the stated mission to educate engineers and scientists, the university focuses primarily on science, technology, engineering, and mathematics. ETH Zurich ran ...
.


Hermite polynomials

Let H_n(x) denote the n-th Hermite polynomial. Let \epsilon and \omega be positive and fixed, then * for x =(2n+1)^\cos \varphi and \epsilon \leq \varphi \leq \pi -\epsilon :: e^H_n(x) =2^(n!)^(\pi n)^(\sin \varphi)^ \bigg\ * for x =(2n+1)^\cosh \varphi and \epsilon \leq \varphi \leq \omega :: e^H_n(x) =2^(n!)^(\pi n)^(\sinh \varphi)^ \exp\left left(\tfrac+\tfrac\right)(2\varphi-\sinh 2\varphi)\right\big\ * for x =(2n+1)^-2^3^n^t and t complex and bounded ::e^H_n(x) =3^\pi^2^(n!)^n^ \bigg\ where A(t) = \pi \operatorname(-3^t) and \operatorname denotes the
Airy function In the physical sciences, the Airy function (or Airy function of the first kind) is a special function named after the British astronomer George Biddell Airy (1801–1892). The function Ai(''x'') and the related function Bi(''x''), are Linear in ...
.


(Associated) Laguerre polynomials

Let L^_n(x) denote the n-th associate Laguerre polynomial. Let \alpha be arbitrary and real, \epsilon and \omega be positive and fixed, then * for x =(4n+2\alpha + 2)\cos^2\varphi and \epsilon\leq \varphi \leq \tfrac -\epsilon n^ :: e^L^_n(x) =(-1)^(\pi \sin \varphi)^x^n^ \big\ * for x =(4n+2\alpha + 2)\cosh^2\varphi and \epsilon\leq \varphi \leq \omega :: e^L^_n(x) =\tfrac(-1)^(\pi \sinh \varphi )^x^n^ \exp\left left(n+\tfrac\right)(2\varphi-\sinh 2\varphi)\right\ * for x =4n+2\alpha + 2 -2(2n/3)^t and t complex and bounded ::e^L^_n(x) =(-1)^n\pi^2^3^n^ \bigg\ where A(t) = \pi \operatorname(-3^t) and \operatorname denotes the
Airy function In the physical sciences, the Airy function (or Airy function of the first kind) is a special function named after the British astronomer George Biddell Airy (1801–1892). The function Ai(''x'') and the related function Bi(''x''), are Linear in ...
.


Literature

*{{cite book, first1=Gábor, last1=Szegő, title=Orthogonal polynomials, volume=4, publisher=American Mathematical Society, place=Providence, Rhode Island, date=1975, isbn=0-8218-1023-5


References

Analysis Asymptotic analysis Orthogonal polynomials