The Koszul map K

Abstract

The Bitableax correspondence isomorphism/Koszul map Theorem (BCK Theorem, for short, Theorem 6.5 below) describes a relevant pair of mutually inverse vector space isomorphisms, the Koszul map K : U(gl(n))-> Sym(gl(n)) and the bitableaux correspondence iWe describe a linear equivariant isomorphism K from the enveloping algebra U(gl(n)) to the algebra C[Mn,n] Sym(gl(n)) of polynomials in the entries of a ``generic'' square matrix of order n. The isomorphism K maps any Capelli bitableau [S|T] in U(gl(n)) to the (determinantal) bitableau (S|T) in C[Mn,n] and any Capelli *-bitableau [S|T]* in U(gl(n)) to the (permanental) *-bitableau (S|T)* in C[Mn,n]. These results are far-reaching generalizations of the pioneering result of J.-L. Koszul [19] on the Capelli determinant in U(gl(n)) (see, e.g. [24], [27]). We introduce column Capelli bitableaux and *-bitableaux in Section 6; since they are mapped by the isomorphism K to monomials in C[Mn,n], this isomorphism can be regarded as a sharpened version of the PBW isomorphism for the enveloping algebra U(gl(n)). Since the center ζ(n) of U(gl(n)) equals the subalgebra of invariants U(gl(n))Adgl(n), then K [ ζ(n) ] = C[Mn,n]adgl(n). somorphism B : Sym(gl(n)) -> U(gl(n)) that deeply link the enveloping algebra U(gl(n)) of the general linear Lie algebra gl(n) and the symmetric algebra Sym(gl(n)). The BCK Theorem can be regarded as a sharpened version of the PBW Theorem for the enveloping algebra U(gl(n)).