Products of longitudinal pseudodifferential operators on flag varieties

Abstract

Associated to each set S of simple roots for SL(n,C) is an equivariant fibration X XS of the space X of complete flags of Cn. To each such fibration we associate an algebra JS of operators on L2(X) which contains, in particular, the longitudinal pseudodifferential operators of negative order tangent to the fibres. These form a lattice of operator ideals whose common intersection is the compact operators. As a consequence, the product of fibrewise smoothing operators (for instance) along the fibres of two such fibrations, X XS and X XT, is a compact operator if S T is the full set of simple roots. The construction uses noncommutative harmonic analysis, and hinges upon a representation theoretic property of subgroups of SU(n), which may be described as `essential orthogonality of subrepresentations'.