On character table of Clifford groups

Abstract

Based on a presentation of Cn and the help of [GAP], we construct the character table of the Clifford group Cn for n=1,2,3. As an application, we can efficiently decompose the (higher power of) tensor product of the matrix representation in those cases. Our results recover some known results in [HWW, WF] and reveal some new phenomena. We prove that when n ≥ 3, (1) the trivial character is the only linear character for Cn and hence Cn equals to its commutator subgroup, (2) the n-qubit Pauli group Pn is the only proper non-trivial normal subgroup of Cn, (3) the matrix representation M2n is a faithful representation for Cn. As a byproduct, we give a presentation of the finite symplectic group Sp(2n,2) in terms of generators and relations.