Anomaly constraint on chiral central charge of (2+1)d topological order
Abstract
In this short paper, we argue that the chiral central charge c- of a (2+1)d topological ordered state is sometimes strongly constrained by 't Hooft anomaly of anti-unitary global symmetry. For example, if a (2+1)d fermionic TQFT has a time reversal anomaly with T2=(-1)F labeled as ∈Z16, the TQFT must have c-=1/4 mod 1/2 for odd , while c-=0 mod 1/2 for even . This generalizes the fact that the bosonic TQFT with T anomaly in a particular class must carry c-=4 mod 8 to fermionic cases. We also study such a constraint for fermionic TQFT with U(1)× CT symmetry, which is regarded as a gapped surface of the topological superconductor in class AIII.
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