A Sobolev estimate for radial Lp-multipliers on a class of semi-simple Lie groups

Abstract

Let G be a semi-simple Lie group in the Harish-Chandra class with maximal compact subgroup K. Let K be minus the radial Casimir operator. Let 14 (G/K) < SG < 12 (G/K) , s ∈ (0, SG] and p ∈ (1,∞) be such that \[ | 1p - 12 | < s2 SG. \] Then, there exists a constant CG,s,p >0 such that for every m ∈ L∞(G) L2(G) bi-K-invariant with m ∈ Dom(Ks) and Ks(m) ∈ L2SG/s(G) we have, \[ Tm: Lp(G) → Lp(G) ≤ CG, s,p Ks(m) L2SG/s(G), \] where Tm is the Fourier multiplier with symbol m acting on the non-commutative Lp-space of the group von Neumann algebra of G. This gives new examples of Lp-Fourier multipliers with decay rates becoming slower when p approximates 2.