Jiarui Fei
Published 2013-02-07, updated 2015-04-13Version 3
We count the $\mathbb{F}_q$-rational points of GIT quotients of quiver representations with relations. We focus on two types of algebras -- one is one-point extended from a quiver $Q$, and the other is the Dynkin $A_2$ tensored with $Q$. For both, we obtain explicit formulas. We study when they are polynomial-count. We follow the similar line as in the first paper but algebraic manipulations in Hall algebra will be replaced by corresponding geometric constructions.
Comments: 18 pages. V2. A missing diagram added. V3. Final version to appear Algebr. Represent. Theory (2015)
Cluster algebras, quiver representations and triangulated categories
On quiver representations over $\mathbb{F}_1$
The extensions of t-structures
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