Clifford quantum computer and the Mathieu groups

Abstract

One learned from Gottesman-Knill theorem that the Clifford model of quantum computing Clark07 may be generated from a few quantum gates, the Hadamard, Phase and Controlled-Z gates, and efficiently simulated on a classical computer. We employ the group theoretical package GAPGAP for simulating the two qubit Clifford group C2. We already found that the symmetric group S(6), aka the automorphism group of the generalized quadrangle W(2), controls the geometry of the two-qubit Pauli graph Pauligraphs. Now we find that the inner group Inn(C2)=C2/Center(C2) exactly contains two normal subgroups, one isomorphic to Z2× 4 (of order 16), and the second isomorphic to the parent A'(6) (of order 5760) of the alternating group A(6). The group A'(6) stabilizes an hexad in the Steiner system S(3,6,22) attached to the Mathieu group M(22). Both groups A(6) and A'(6) have an outer automorphism group Z2× Z2, a feature we associate to two-qubit quantum entanglement.