A functor for constructing R-matrices in the category O of Borel quantum loop algebras

Abstract

We tackle the problem of constructing R-matrices for the category O associated to the Borel subalgebra of an arbitrary untwisted quantum loop algebra Uq(g). For this, we define an exact functor Fq from the category O linked to Uq-1(g) to the one linked to Uq(g). This functor Fq is compatible with tensor products, preserves irreducibility and interchanges the subcategories O+ and O- of (D. Hernandez, B. Leclerc, Algebra Number Theory, 2016). We construct R-matrices for O+ by applying Fq on the braidings already found for O- in (D. Hernandez, Rep. Theory, 2022). We also use the factorization of the latter intertwiners in terms of stable maps to deduce an analogous factorization for our new braidings. We finally obtain as byproducts new relations for the Grothendieck ring K0(O) as well as a functorial interpretation of a remarkable ring isomorphism K0(O+) K0(O-) of Hernandez--Leclerc.