Counting Quiver Representations over Finite Fields Via Graph Enumeration

Abstract

Let be a quiver on n vertices v1, v2, ..., vn with gij edges between vi and vj, and let α ∈ n. Hua gave a formula for A(α, q), the number of isomorphism classes of absolutely indecomposable representations of over the finite field q with dimension vector α. Kac showed that A(α, q) is a polynomial in q with integer coefficients. Using Hua's formula, we show that for each non-negative integer s, the s-th derivative of A(α,q) with respect to q, when evaluated at q = 1, is a polynomial in the variables gij, and we compute the highest degree terms in this polynomial. Our formulas for these coefficients depend on the enumeration of certain families of connected graphs.