Back to baxterisation

Abstract

In the continuity of our previous paper arXiv:1509.05516, we define three new algebras, An(a,b,c), Bn and Cn, that are close to the braid algebra. They allow to build solutions to the braided Yang-Baxter equation with spectral parameters. The construction is based on a baxterisation procedure, similar to the one used in the context of Hecke or BMW algebras. The An(a,b,c) algebra depends on three arbitrary parameters, and when the parameter a is set to zero, we recover the algebra Mn(b,c) already introduced elsewhere for purpose of baxterisation. The Hecke algebra (and its baxterisation) can be recovered from a coset of the An(0,0,c) algebra. The algebra An(0,b,-b2) is a coset of the braid algebra. The two other algebras Bn and Cn do not possess any parameter, and can be also viewed as a coset of the braid algebra.