In mathematics, a zonal spherical function or often just spherical function is a function on a locally compact group G with compact subgroup K (often a maximal compact subgroup) that arises as the matrix coefficient of a K-invariant vector in an irreducible representation of G. The key examples are the matrix coefficients of the spherical principal series, the irreducible representations appearing in the decomposition of the unitary representation of G on L2(G/K). In this case the commutant of G is generated by the algebra of biinvariant functions on G with respect to K acting by right convolution. It is commutative if in addition G/K is a symmetric space, for example when G is a connected semisimple Lie group with finite centre and K is a maximal compact subgroup. The matrix coefficients of the spherical principal series describe precisely the spectrum of the corresponding
C* algebra generated by the biinvariant functions of compact support, often called a Hecke algebra. The spectrum of the commutative Banach *-algebra of biinvariant L1 functions is larger; when G is a semisimple Lie group with maximal compact subgroup K, additional characters come from matrix coefficients of the complementary series, obtained by analytic continuation of the spherical principal series.
Zonal spherical functions have been explicitly determined for real semisimple groups by Harish-Chandra. For special linear groups, they were independently discovered by Israel Gelfand and Mark Naimark. For complex groups, the theory simplifies significantly, because G is the complexification of K, and the formulas are related to analytic continuations of the Weyl character formula on K. The abstract functional analytic theory of zonal spherical functions was first developed by Roger Godement. Apart from their group theoretic interpretation, the zonal spherical functions for a semisimple Lie group G also provide a set of simultaneous eigenfunctions for the natural action of the centre of the universal enveloping algebra of G on L2(G/K), as differential operators on the symmetric space G/K. For semisimple p-adic Lie groups, the theory of zonal spherical functions and Hecke algebras was first developed by Satake and Ian G. Macdonald. The analogues of the Plancherel theorem and Fourier inversion formula in this setting generalise the eigenfunction expansions of Mehler, Weyl and Fock for singular ordinary differential equations: they were obtained in full generality in the 1960s in terms of Harish-Chandra's c-function.
The name "zonal spherical function" comes from the case when G is SO(3,R) acting on a 2-sphere and K is the subgroup fixing a point: in this case the zonal spherical functions can be regarded as certain functions on the sphere invariant under rotation about a fixed axis.
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his doctorial student Alan Graham Constantine. They appear as zonalsphericalfunctions of the Gelfand pairs ( S 2 n , H n ) {\displaystyle (S_{2n},H_{n})}...
space of S L ( 2 , R ) {\displaystyle SL(2,\mathbb {R} )} (see Zonalsphericalfunction). Actually the Fourier transform on L 1 ( G / / K ) {\displaystyle...
theory of differential equations. It is the special case for zonalsphericalfunctions of the general Plancherel theorem for semisimple Lie groups, also...
investigations in the USSR and Japan. Work on the abstract theory of sphericalfunctions published in 1952 proved very influential in subsequent work, particularly...
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Mehler–Heine formula; and Mehler functions (conical functions), in connection with his utilization of Zonalsphericalfunctions in Electromagnetic theory. Krause...
is the Rossby parameter, k is the zonal wavenumber, and ℓ is the meridional wavenumber. It is noted that the zonal phase speed of Rossby waves is always...
\cdot \mathbf {y} )} are spherical harmonics, when regarded as a function of x only. They are, in fact, exactly the zonalspherical harmonics, up to a normalizing...
equation (6) (the Laplace equation) are called spherical harmonic functions. They take the forms: where spherical coordinates (r, θ, φ) are used, given here...
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departures of it from spherical symmetry. From the point of view of satellite dynamics, of particular relevance are the so-called even zonal harmonic coefficients...
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the Earth, including the antipodes, zonal maps showing the Ptolemaic climates derived from the concept of a spherical Earth and a diagram showing the Earth...
cemented in the posterior element had 3 functions: to reduce the spherical aberration; reduce the overcorrected spherical-oblique aberration; and reduce the...
covers the whole mirror surface is called a "modal" function, while localized response is called "zonal". Actuator coupling shows how much the movement of...