Non-combinatorial involutive braidings: the quantum algebra glk,m

Abstract

We investigate involutive, non-combinatorial solutions of the braid equation, viewing them as special deformations of the permutation map. Utilizing these solutions, we identify the associated quantum algebra and introduce it as the glk,m Yangian. This newly derived Yangian is distinct from the known Yangian of the general linear Lie superalgebra; crucially, as a Hopf algebra, it possesses the standard tensor product algebra structure. The underlying algebra glk,m is also introduced as a novel structure and constitutes a subalgebra of the Yangian. We then construct specific highest-weight modules of glk,m that simultaneously yield the eigenstates of spin-chain-like ``Hamiltonians'', which are defined as the sum of the generators of the A-type braid group. Furthermore, we study the highest-weight representations and the corresponding combinatorial bases for gl1,1, explicitly linking them to specific shapes of Young tableaux.