CFTD from TQFTD+1 via Holographic Tensor Network, and Precision Discretisation of CFT2

Abstract

We show that the path-integral of conformal field theories in D dimensions (CFTD) can be constructed by solving for eigenstates of an RG operator following from the Turaev-Viro formulation of a topological field theory in D+1 dimensions (TQFTD+1), explicitly realising the holographic sandwich relation between a symmetric theory and a TQFT. Generically, exact eigenstates corresponding to symmetric-TQFTD follow from Frobenius algebra in the TQFTD+1. For D=2, we constructed eigenstates that produce 2D rational CFT path-integral exactly, which, curiously connects a continuous field theoretic path-integral with the Turaev-Viro state sum. We also devise and illustrate numerical methods for D=2,3 to search for CFTD as phase transition points between symmetric TQFTD. Finally since the RG operator is in fact an exact analytic holographic tensor network, we compute ``bulk-boundary'' correlator and compare with the AdS/CFT dictionary at D=2. Promisingly, they are numerically compatible given our accuracy, although further works will be needed to explore the precise connection to the AdS/CFT correspondence.