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- Categorification of quiver diagonalization and Koszul algebras(arXiv)
Author : Vladimir Dotsenko, Evgeny Feigin, Piotr Kucharski, Markus Reineke
Abstract : In earlier work of three of the authors of the present paper, a supercommutative quadratic algebra was associated to each symmetric quiver, and a new proof of positivity of motivic Donaldson-Thomas invariants of symmetric quivers was given using the so called numerical Koszul property of these algebras. It was furthermore conjectured that for each symmetric quiver such an algebra is Koszul. In this work, we lift the linking and unlinking operations on symmetric quivers of Ekholm, Longhi and the third author to the level of quadratic algebras, and use those lifts to prove the Koszulness conjecture
2.Drinfeld twists of Koszul algebras (arXiv)
Author : Edward Jones-Healey
Abstract : Given a Hopf algebra H and a counital 2-cocycle μ on H, Drinfeld introduced a notion of twist which deforms an H-module algebra A into a new algebra Aμ. We show that when A is a quadratic algebra, and H acts on A by degree-preserving endomorphisms, then the twist Aμ is also quadratic. Furthermore, if A is a Koszul algebra, then Aμ is a Koszul algebra. As an application, we prove that the twist of the q-quantum plane by the quasitriangular structure of the quantum enveloping algebra Uq(sl2) is a quadratic algebra equal to the q−1-quantum plane.