On the automorphism groups of q-enveloping algebras of nilpotent Lie algebras

Abstract

We investigate the automorphism group of the quantised enveloping algebra U of the positive nilpotent part of certain simple complex Lie algebras g in the case where the deformation parameter q ∈ C* is not a root of unity. Studying its action on the set of minimal primitive ideals of U we compute this group in the cases where g=sl3 and g=so5 confirming a Conjecture of Andruskiewitsch and Dumas regarding the automorphism group of U. In the case where g=sl3, we retrieve the description of the automorphism group of the quantum Heisenberg algebra that was obtained independently by Alev and Dumas, and Caldero. In the case where g=so5, the automorphism group of U was computed in [16] by using previous results of Andruskiewitsch and Dumas. In this paper, we give a new (simpler) proof of the Conjecture of Andruskiewitsch and Dumas in the case where g=so5 based both on the original proof and on graded arguments developed in [17] and [18].