Studying 3D O(N) Surface CFT on the Fuzzy Sphere

Abstract

Boundary conformal field theory (BCFT) provides a universal framework for critical phenomena in the presence of boundaries. We determine BCFT data for the normal and ordinary boundary universality classes of the 1+1-dimensional boundaries of the 2+1-dimensional O(2) and O(3) Wilson-Fisher fixed points, realized microscopically by a bilayer Heisenberg model on the fuzzy sphere. Using the fuzzy-sphere state-operator correspondence, we obtain boundary operator spectra, identify low-lying boundary primary operators, extract operator-product-expansion (OPE) data, and estimate the boundary central charges for both boundary conditions. For the normal boundary condition, the universal amplitudes aσ and bt extracted from one- and two-point functions agree quantitatively with Monte Carlo benchmarks where available. For both N=2 and N=3, we find a positive extraordinary-log exponent α, providing independent microscopic evidence for extraordinary-log boundary criticality. Our results extend fuzzy-sphere BCFT spectroscopy beyond the Ising universality class to continuous O(N) symmetry.