0-affine quantum groups as K-theoretic Hall algebras
Abstract
In this note, we show that the positive part of Arkhipov-Mazin's 0-affine quantum group can be realized as the K-theoretic Hall algebra of the type A Dynkin quiver. We then construct a categorical action of this positive part and demonstrate that such an action induces semiorthogonal decompositions on the corresponding weight categories. As a main example, we study the bounded derived category of coherent sheaves on n-step partial flag varieties.
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