Using the quantum torus to investigate the q-Onsager algebra

Abstract

The q-Onsager algebra, denoted by Oq, is defined by generators W0, W1 and two relations called the q-Dolan-Grady relations. In 2017, Baseilhac and Kolb gave some elements of Oq that form a Poincar\'e-Birkhoff-Witt basis. The quantum torus, denoted by Tq, is defined by generators x, y, x-1, y-1 and relations xx-1 = 1 = x-1x, yy-1 = 1 = y-1y, xy=q2yx. The set \xiyj | i,j ∈ Z \ is a basis for Tq. It is known that there is an algebra homomorphism p: Oq Tq that sends W0 x+x-1 and W1 y+y-1. In 2020, Lu and Wang displayed a variation of Oq, denoted by U. Lu and Wang gave a surjective algebra homomorphism : U Oq. In their consideration of U, Lu and Wang introduced some elements equation intrp503 \B1,r\r ∈ Z, \H'n\n=1∞, \Hn\n=1∞, \'n\n=1∞, \n\n=1∞. equation These elements are defined using recursive formulas and generating functions, and it is difficult to express them in closed form. A similar problem applies to the Baseilhac-Kolb elements of Oq. To mitigate this difficulty, we map everything to Tq using p and . In our main results, we express the resulting images in the basis for Tq and also in an attractive closed form.

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