The alternating central extension of the q-Onsager algebra

Abstract

The q-Onsager algebra Oq is presented by two generators W0, W1 and two relations, called the q-Dolan/Grady relations. Recently Baseilhac and Koizumi introduced a current algebra Aq for Oq. Soon afterwards, Baseilhac and Shigechi gave a presentation of Aq by generators and relations. We show that these generators give a PBW basis for Aq. Using this PBW basis, we show that the algebra Aq is isomorphic to Oq F z1, z2, … , where F is the ground field and zn n=1∞ are mutually commuting indeterminates. Recall the positive part U+q of the quantized enveloping algebra Uq(sl2). Our results show that Oq is related to Aq in the same way that U+q is related to the alternating central extension of U+q. For this reason, we propose to call Aq the alternating central extension of Oq.