Zonotopal algebras, orbit harmonics, and Donaldson-Thomas invariants of symmetric quivers
Abstract
We apply the method of orbit harmonics to the set of break divisors and orientable divisors on graphs to obtain the central and external zonotopal algebras respectively. We then relate a construction of Efimov in the context of cohomological Hall algebras to the central zonotopal algebra of a graph GQ,γ constructed from a symmetric quiver Q with enough loops and a dimension vector γ. This provides a concrete combinatorial perspective on the former work, allowing us to identify the quantum Donaldson-Thomas invariants as the Hilbert series of the space of Sγ-invariants of the Postnikov-Shapiro slim subgraph space attached to GQ,γ. The connection with orbit harmonics in turn allows us to give a manifestly nonnegative combinatorial interpretation to numerical Donaldson-Thomas invariants as the number of Sγ-orbits under the permutation action on the set of break divisors on GQ,γ. We conclude with several representation-theoretic consequences, whose combinatorial ramifications may be of independent interest.
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