Permutationally-Invariant N-body gates via Tavis-Cummings Hamiltonian
Abstract
Widely used in atomic and superconducting qubit systems, the Jaynes-Cummings (JC) Hamiltonian is a simple, yet powerful model for a two-level system interacting with a quantum harmonic oscillator. In this paper, we focus on a system of n qubits, identically coupled to a single oscillator via JC interaction, also known as the Tavis-Cummings (TC) Hamiltonian. We show that all permutationally-invariant unitaries on an arbitrary number of qubits can be realized using this permutationally-invariant Hamiltonian, which couples the qubits to an oscillator initialized in its vacuum state, together with global uniform x and z fields on all qubits. This includes useful gates, such as controlled-Z gate with an arbitrary number of control qubits. As a corollary, we find that all permutationally invariant states -- including useful entangled states such as GHZ and Dicke states -- can be prepared using this interaction and global fields. We also characterize unitaries that can be realized on the joint Hilbert space of the qubits and oscillator with the TC interaction and global z field, and develop new methods for preparing the state of the oscillator in an arbitrary initial state. We present various examples of explicit circuits for the case of n=2 qubits. In particular, we develop new methods for implementing controlled-Z, SWAP, iSWAP, and $\sqrt{i\text{SWAP}}$ gates using only the TC interaction and a global z field. Our work also reveals an accidental symmetry in the TC Hamiltonian and shows that it can be explained using Schwinger's oscillator model of angular momentum.