Braid group action and quasi-split affine groups II: higher rank

Abstract

This paper studies quantum symmetric pairs ( U, U ) associated with quasi-split Satake diagrams of affine type A2r-1, Dr, E6 with a nontrivial diagram involution fixing the affine simple node. Various real and imaginary root vectors for the universal groups U are constructed with the help of the relative braid group action, and they are used to construct affine rank one subalgebras of U. We then establish relations among real and imaginary root vectors in different affine rank one subalgebras and use them to give a Drinfeld type presentation of U.

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