algebras of weighted projective lines and quantum symmetric pairs III: quasi-split type

Abstract

From a category A with an involution , we introduce -complexes, which are a generalization of (bounded) complexes, periodic complexes and modules of algebras. The homological properties of the category C(A) of -complexes are given to make the machinery of semi-derived Ringel-Hall algebras applicable. The algebra of the weighted projective line X is the twisted semi-derived Ringel-Hall algebra of C( coh(X)), where is an involution of coh(X). This algebra is used to realize the quasi-split loop algebra, which is a generalization of the group arising from the quantum symmetric pair of quasi-split affine type ADE in its Drinfeld type presentation.

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