3D Ising CFT and exact diagonalization on icosahedron: The power of conformal perturbation theory

Abstract

We consider the transverse field Ising model in (2+1)D, putting 12 spins at the vertices of the regular icosahedron. The model is tiny by the exact diagonalization standards, and breaks rotation invariance. Yet we show that it allows a meaningful comparison to the 3D Ising CFT on \mathbb{R}× S^2ℝ×S2, by including effective perturbations of the CFT Hamiltonian with a handful of local operators. This extreme example shows the power of conformal perturbation theory in understanding finite N effects in models on regularized S^2S2. Its ideal arena of application should be the recently proposed models of fuzzy sphere regularization.