Shard theory for g-fans

Abstract

For a finite dimensional algebra A, the notion of g-fan (A) is defined from two-term silting complexes of A in the real Grothendieck group K0(proj A)R. In this paper, we discuss the theory of shards to (A), which was originally defined for a hyperplane arrangement. We establish a correspondence between the set of join-irreducible elements of the poset of torsion classes of mod A and the set of shards of (A) for g-finite algebra A. Moreover, we show that the semistable region of a brick of mod A is exactly given by a shard. We also give a poset isomorphism of shard intersections and wide subcategories of mod A.

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