Given a quiver with potential, Victor Ginzburg associated a dg-algebra, now called Ginzburg (dg-)algebra, which supplies an example of a 3-Calabi-Yau algebra (also defined by Ginzburg). They may be viewed as a derived thickening…
Victor Ginzburg, Calabi-Yau algebras, arXiv:math.AG/0612139
Bernhard Keller (with an appendix by Michel van den Bergh), Deformed Calabi-Yau completions, J. Reine Angew. Math. 654 (2011) 125–180 doi
Stephen Hermes, Minimal model of Ginzburg algebras, Journal of Algebra 459 (2016) 389-436 doi; On the Homology of the Ginzburg Algebra, slides (2013) pdf
M. Christ, Ginzburg algebras of triangulated surfaces and perverse schobers, Forum of Mathematics, Sigma (2022), Vol. 10:e8 1–72 doi
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