Invariant differential operators and an infinite dimensional Howe-type correspondence. Part I: Structure of the associated algebras of differential operators

Abstract

If Q is a non degenerate quadratic form on Cn, it is well known that the differential operators X=Q(x), Y=Q(∂), and H=E+n2, where E is the Euler operator, generate a Lie algebra isomorphic to sl2. Therefore the associative algebra they generate is a quotient of the universal enveloping algebra U( sl2). This fact is in some sense the foundation of the metaplectic representation. The present paper is devoted to the study of the case where Q(x) is replaced by 0(x), where 0(x) is the relative invariant of a prehomogeneous vector space of commutative parabolic type ( g,V ), or equivalently where 0 is the "determinant" function of a simple Jordan algebra V over C. In this Part I we show several structure results for the associative algebra generated by X=0(x), Y=0(∂). Our main result shows that if we consider this algebra as an algebra over a certain commutative ring A of invariant differential operators it is isomorphic to the quotient of what we call a generalized Smith algebra S(f, A, n) where f∈ A[t]. The Smith algebras (over C) were introduced by P. Smith as "natural" generalizations of U( sl2).