Eisenstein integral

In mathematical representation theory, the Eisenstein integral is an integral introduced by Harish-Chandra^[1] in the representation theory of semisimple Lie groups, analogous to Eisenstein series in the theory of automorphic forms. Harish-Chandra used Eisenstein integrals to decompose the regular representation of a semisimple Lie group into representations induced from parabolic subgroups.^[2] Trombi gave a survey of Harish-Chandra's work on this.^[3]

Harish-Chandra^[4] defined the Eisenstein integral by

${\displaystyle {\displaystyle E(P:\psi :\nu :x)=\underset{K}{\int }\psi (xk)\tau (k^{-1})\exp ((i\nu -{\rho }_P)H_P(xk))dk}}$

where:

• x is an element of a semisimple group G
• P = MAN is a cuspidal parabolic subgroup of G
• ν is an element of the complexification of a
• a is the Lie algebra of A in the Langlands decomposition P = MAN.
• K is a maximal compact subgroup of G, with G = KP.
• ψ is a cuspidal function on M, satisfying some extra conditions
• τ is a finite-dimensional unitary double representation of K
• H_P(x) = log a where x = kman is the decomposition of x in G = KMAN.

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