Decay estimates for matrix coefficients of unitary representations of semisimple Lie groups

Abstract

Let G be a connected semisimple Lie group with finite centre and K be a maximal compact subgroup thereof. Given a function u on G, we define A u to be the root mean square average over K, acting both on the left and the right, of u. We show that for all unitary representations π of G, there exists a unique minimal positive-real-valued spherical function φλ on G such that A π(·) , η ≤ Hπ η Hπ φλ. This estimate has nice features of both asymptotic pointwise estimates and Lebesgue space estimates; indeed it is equivalent to pointwise estimates π(·) , η ≤ C(, η) \,φλ for K-finite or smooth vectors and η, and it exhibits different decay rates in different directions at infinity in G. Further, if we assume the latter inequality with arbitrary C( , η ), we can prove the former inequality and then return to the latter inequality with explicit knowledge of C( , η ). On the other hand, it holds everywhere in G, in contrast to asymptotic estimates which are not global. We also provide some applications.