Lp-bounds for pseudo-differential operators on compact Lie groups

Abstract

Given a compact Lie group G, in this paper we establish Lp-bounds for pseudo-differential operators in Lp(G). The criteria here are given in terms of the concept of matrix symbols defined on the non-commutative analogue of the phase space G×G, where G is the unitary dual of G. We obtain two different types of Lp bounds: first for finite regularity symbols and second for smooth symbols. The conditions for smooth symbols are formulated using S,δm(G) classes which are a suitable extension of the well known (,δ) ones on the Euclidean space. The results herein extend classical Lp bounds established by C. Fefferman on Rn. While Fefferman's results have immediate consequences on general manifolds for >\δ,1-δ\, our results do not require the condition >1-δ. Moreover, one of our results also does not require >δ. Examples are given for the case of SU(2) S3 and vector fields/sub-Laplacian operators when operators in the classes S0,0m and S12,0m naturally appear, and where conditions >δ and >1-δ fail, respectively.