Clifford groups are not always 2-designs

Abstract

The Clifford group is the quotient of the normalizer of the Weyl-Heisenberg group in dimension d by its centre. We prove that when d is not prime the Clifford group is not a group unitary 2-design. Furthermore, we prove that the multipartite Clifford group is not a group unitary 2-design except for the known cases wherein the local Hilbert space dimensions are a constant prime number. We also clarify the structure of projective group unitary 2-designs. We show that the adjoint action induced by a group unitary 2-design decomposes into exactly two irreducible components; moreover, a group is a unitary 2-design if and only if the character of its so-called UU representation is 2.