Abstract:We study half-BPS boundary 't Hooft lines of non-minuscule magnetic charge in four-dimensional $\mathcal N=4$ $U(N)$ super Yang--Mills theory with the regular Nahm-pole boundary condition. In contrast to minuscule charges, non-minuscule boundary 't Hooft lines receive monopole bubbling contributions. For all one-row charges $\lambda=(r,0,\ldots,0)$ we compute the bubbling-corrected defect half-index and identify the boundary 't Hooft operator with the spherical DAHA element $\mathbf e h_r(Y)\mathbf e$. Its difference-operator expansion gives the screened magnetic sectors, while the Macdonald kernel proves equality with the S-dual Neumann Wilson-line half-index. As a consequence we obtain the identity for all dominant magnetic charges of $U(2)$. The boundary fixed-point formula realizes the same coefficients and gives explicit non-minuscule examples in ranks two and three.
From: Ruiliang Li [view email]
[v1]
Mon, 15 Jun 2026 12:55:14 UTC (48 KB)
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