The q-immanants and higher quantum Capelli identities

Abstract

We construct polynomials Sμ(z) parameterized by Young diagrams μ, whose coefficients are central elements of the quantized enveloping algebra Uq(gln). Their constant terms coincide with the central elements provided by the general construction of Drinfeld and Reshetikhin. For another special value of z, we get q-analogues of Okounkov's quantum immanants for gln. We show that the Harish-Chandra image of Sμ(z) is a factorial Schur polynomial. We also prove quantum analogues of the higher Capelli identities and derive Newton-type identities.