Geometry of C-vectors and C-Matrices for Mutation-Infinite Quivers

Abstract

The set of forks is a class of quivers introduced by M. Warkentin, where every connected mutation-infinite quiver is mutation equivalent to infinitely many forks. Let Q be a fork with n vertices, and w be a fork-preserving mutation sequence. We show that every c-vector of Q obtained from w is a solution to a quadratic equation of the form Σi=1n xi2 + Σ1≤ i<j≤ n qij xi xj =1, where qij is the number of arrows between the vertices i and j in Q. The same proof techniques implies that when Q is a rank 3 mutation-cyclic quiver, every c-vector of Q is a solution to a quadratic equation of the same form.

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