Non-invertible bosonic chiral symmetry on the lattice
Abstract
In this work we realize the 3 + 1 dimensional non-invertible ZN chiral symmetry generator as an operator in a many body lattice Hilbert space. A crucial ingredient in our construction is the use of infinite dimensional U(1) rotor site Hilbert spaces. Specifically, our Hilbert space is that of a U(1) lattice gauge theory coupled to a charge 1 scalar in the Villain formulation, which allows for direct access to monopoles and for a simple definition of a magnetic ZN one-form symmetry Z(1)m , at the lattice Hamiltonian level. We construct the generator of the ZN chiral symmetry as as a unitary operator in the subspace of Z(1)m-invariant states, and show that it cannot be extended to the entire Hilbert space while preserving locality and unitarity. Using a lattice-level duality based on gauging Z(1)m, we find a dual description of this subspace, as the subspace of a charge 1/N gauge theory invariant under an electric one-form symmetry Z(1)e. We show that in this dual formulation, the chiral symmetry generator does extend unitarily to the entire Hilbert space, but has a mixed anomaly with the Z(1)e symmetry.
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