A class of half-BPS boundary conditions for AK-1 circular quivers

Abstract

We study a string-motivated class of 12-BPS boundary conditions for 4d N=2 AK-1 circular quiver gauge theories, engineered by D4-branes suspended between NS5-branes on a circle. For D4-branes ending on boundary D6-branes, a single-pole ansatz reduces the BPS equations to a rigid algebraic problem. We characterize the structure of its solutions, which exhibit a winding phenomenon with no analogue for linear quivers, and solve two cases explicitly in closed form. Supported by a brane-duality argument, we propose the maximal-winding solution as a candidate S-dual of the pure Neumann boundary condition.