Un-Weyl-ing the Clifford Hierarchy

TL;DR

This paper investigates the structure of the second and third levels of the Clifford hierarchy using Weyl expansion, revealing new insights into their Pauli support and implications for quantum error correction.

Contribution

It characterizes the Pauli support of second and third level unitaries in the Clifford hierarchy, advancing understanding beyond diagonal cases and supporting the semi-Clifford conjecture.

Findings

Characterized support of Clifford operations on Pauli group.

Identified that third level unitaries commute with at least one Pauli matrix.

Supported the generalized semi-Clifford conjecture.

Abstract

The teleportation model of quantum computation introduced by Gottesman and Chuang (1999) motivated the development of the Clifford hierarchy. Despite its intrinsic value for quantum computing, the widespread use of magic state distillation, which is closely related to this model, emphasizes the importance of comprehending the hierarchy. There is currently a limited understanding of the structure of this hierarchy, apart from the case of diagonal unitaries (Cui et al., 2017; Rengaswamy et al. 2019). We explore the structure of the second and third levels of the hierarchy, the first level being the ubiquitous Pauli group, via the Weyl (i.e., Pauli) expansion of unitaries at these levels. In particular, we characterize the support of the standard Clifford operations on the Pauli group. Since conjugation of a Pauli by a third level unitary produces traceless Hermitian Cliffords, we characterize their Pauli support as well. Semi-Clifford unitaries are known to have ancilla savings in the teleportation model, and we explore their Pauli support via symplectic transvections. Finally, we show that, up to multiplication by a Clifford, every third level unitary commutes with at least one Pauli matrix. This can be used inductively to show that, up to a multiplication by a Clifford, every third level unitary is supported on a maximal commutative subgroup of the Pauli group. Additionally, it can be easily seen that the latter implies the generalized semi-Clifford conjecture, proven by Beigi and Shor (2010). We discuss potential applications in quantum error correction and the design of flag gadgets.