报告题目:On quivers with analytic potentials
报告人:华诤,香港大学
时间:2019年4月22日下午15:00-16:00
地点:五教5305
摘要: Given a finite quiver, an element of the complete path algebra over field of complex number is called analytic if its coefficients are bounded by a geometric series. We may develop a parallel construction of Jacobi algebra and Ginzburg algebra for a quiver with an analytic potential. Analytic potential occurs naturally in the deformation theory of sheaves on projective Calabi-Yau manifold. It turns out that analytic potentials admit much richer structures in noncommutative differential calculus compared with the formal ones. I will give a brief introduction to some of my recent work on this topic.
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