Galois Covers of Calabi-Yau Quivers and BPS State Counting

Abstract

BPS quivers are central to our understanding of BPS states in 4d N=2 supersymmetric field theories and of D-branes at Calabi-Yau threefold singularities. The two subjects are deeply interrelated through geometric engineering in Type II string theory, where a CY3 quiver, also known as a 5d BPS quiver, describes fractional branes at a threefold singularity X. We study the Galois cover 2 Q→ Q of any BPS quiver Q by a finite abelian group G, leading to a covering quiver 2 Q. The Galois cover is determined by a G-grading of the arrows of the quiver Q, which can be understood as an orbifolding procedure. In particular, if Q is a CY3 quiver for X, then the Galois cover 2 Q is the CY3 quiver for the orbifold singularity X/G. We explore such Galois covering procedures in the language of supersymmetric quiver quantum mechanics, in terms of fixed loci under G actions on moduli spaces of quiver representations, and in terms of homomorphisms between the Kontsevich-Soibelman algebras of Q and 2 Q. Our main result is an explicit covering formula for the BPS invariants of 4d N=2 field theories, wherein the rational BPS invariant Q(γ) of Q is expressed as a sum of BPS invariants of 2 Q. We derive this formula in various special cases, which include the case when γ is a primitive charge vector, the case of general charge vectors for quivers without loops, and the case of CY3 quivers for some simple geometries such as the conifold or local del Pezzo surfaces. The general formula is presented as a conjecture that can be verified in many examples.

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