The alternating presentation of Uq(gl2) from Freidel-Maillet algebras

Abstract

An infinite dimensional algebra denoted Aq that is isomorphic to a central extension of Uq+ - the positive part of Uq(sl2) - has been recently proposed by Paul Terwilliger. It provides an `alternating' Poincar\'e-Birkhoff-Witt (PBW) basis besides the known Damiani's PBW basis built from positive root vectors. In this paper, a presentation of Aq in terms of a Freidel-Maillet type algebra is obtained. Using this presentation: (a) finite dimensional tensor product representations for Aq are constructed; (b) explicit isomorphisms from Aq to certain Drinfeld type `alternating' subalgebras of Uq(gl2) are obtained; (c) the image in Uq+ of all the generators of Aq in terms of Damiani's root vectors is obtained. A new tensor product decomposition for Uq(sl2) in terms of Drinfeld type `alternating' subalgebras follows. The specialization q→ 1 of Aq is also introduced and studied in details. In this case, a presentation is given as a non-standard Yang-Baxter algebra. This paper is dedicated to Paul Terwilliger for his 65th birthday.