Compatibility of Drinfeld presentations and q-characters for affine Kac-Moody quantum symmetric pairs: quasi-split case

Abstract

Let (U, U) be a quasi-split affine quantum symmetric pair of type AIII. This case is of particular interest thanks to the existence of geometric realizations and Schur--Weyl dualities. We establish factorization and coproduct formulae for the Drinfeld--Cartan series i(z) in the Lu--Pan--Wang--Zhang `new Drinfeld'-style presentation, generalizing the split type results from [Prz23, LP25a]. As an application, we construct a boundary analogue of the q-character map, and show that it is compatible with Frenkel and Reshetikhin's original q-character homomorphism.