S-confinement of 3d Argyres-Douglas theories and the Seiberg-like duality with an adjoint matter

Abstract

We propose an N=2 preserving deformation that leads to the confining phase of the 3d reduction of the Dp[SU(N)] Argyres-Douglas theories, referred to as Dp[SU(N)]. This deformation incorporates monopole superpotential terms, which have recently played interesting roles in exploring possible RG fixed points of 3d supersymmetric gauge theories. Employing this confining phenomenon in 3d Dp[SU(N)] theories, we also propose a deconfined version of the Kim-Park duality, an IR duality for 3d N=2 adjoint SQCDs, where an adjoint matter field is replaced by a linear quiver tail of Dp[SU(N)]. Surprisingly, both the confinement of deformed Dp[SU(N)] and the deconfined Kim-Park duality can be proven only assuming some basic 3d N=2 IR dualities. Finally, we propose a variant of the Kim-Park duality deformed by a single monopole superpotential term, which can also be derived using the same method.

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