Radial Quantization for Conformal Field Theories on the Lattice
Abstract
We consider radial quantization for conformal quantum field theory with a lattice regulator. A Euclidean field theory on RD is mapped to a cylindrical manifold, R× SD-1, whose length is logarithmic in scale separation. To test the approach, we apply this to the 3D Ising model and compute η for the first Z2 odd primary operator.
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