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Verdier quotients of Calabi-Yau categories from quivers with potential
Published 31 Oct 2024 in math.RT | (2411.00207v1)
Abstract: We study a class of triangulated categories obtained as Verdier quotients of 3-Calabi-Yau categories combinatorially described by quivers with potential from (decorated) marked surfaces. We study their bounded t-structures and consider in particular the exchange graphs of hearts and silting objects, and show that the Koszul isomorphism between these graphs is preserved under Verdier quotient.
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