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Modular invariants and NIM-reps

Published 20 Mar 2026 in math.QA and math-ph | (2603.20545v1)

Abstract: Given a pivotal module category over a spherical fusion category, we introduce the encircling module, a module over the fusion algebra defined using the pivotal structure, and prove that it is isomorphic to the NIM-rep as a fusion algebra module. When applied to the $\mathcal{TM}$ realisation of the modular invariant partition function (arXiv:1911.09024), this yields an identification of the diagonal entries of the modular invariant with the NIM-rep multiplicities, providing a categorical generalisation of Böckenhauer, Evans and Kawahigashi's results (arXiv:math/9907149). We also show that for indecomposable module categories the dimension condition on $\mathcal{TM}$ required for modular invariance is automatically satisfied, and that $\mathcal{TM}$ recovers the full centre construction of Kong and Runkel (arXiv:0807.3356).

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