Verlinde lines, anyon permutations and commutant pairs inside E8,1 CFT

Abstract

We develop a defect-theoretic refinement of meromorphic 2d CFTs in which the ordinary torus partition function -- often just the vacuum character -- does not reveal how states organize under symmetry lines. Our central proposal is an equatorial projection framework: from a commutant decomposition into commuting rational chiral algebras with categories C and C, we encode genus-one couplings by a non-negative integer matrix M pairing characters and satisfying modular intertwiner relations. Invertible topological defect lines act directly on this gluing data (Verlinde lines diagonally via S-matrix eigenvalues, and anyon-permuting lines by braided-autoequivalence permutations), making modular covariance of defect amplitudes automatic and sharply distinguishing insertions that yield genuine modular invariants from those defining consistent non-holomorphic interfaces. We further show that the replacement rules of Hegde:2021sdm, Lin:2019hks arise as equatorial projections of defect actions, and we extend these constructions beyond two-character examples by systematically treating three-character commutant pairs in the E8,1 theory. The unique c=8 meromorphic CFT E8,1 serves as a universal testbed, producing new defect partition functions and clarifying the roles of Pic(C) and Autbr(C). Finally, we outline extensions to higher central charges (e.g.\ c=32,40), yielding modular-invariant non-meromorphic theories beyond the c=24 Schellekens landscape Schellekens:1992db as defect/interface descendants of meromorphic parents.