Phase Squeezing of Quantum Hypergraph States

Abstract

Corresponding to a hypergraph G with d vertices, a quantum hypergraph state is defined by |G = 12dΣn = 02d - 1 (-1)f(n) |n , where f is a d-variable Boolean function depending on the hypergraph G, and |n denotes a binary vector of length 2d with 1 at n-th position for n = 0, 1, … (2d - 1). The non-classical properties of these states are studied. We consider annihilation and creation operator on the Hilbert space of dimension 2d acting on the number states \|n : n = 0, 1, … (2d - 1)\. The Hermitian number and phase operators, in finite dimensions, are constructed. The number-phase uncertainty for these states leads to the idea of phase squeezing. We establish that these states are squeezed in the phase quadrature only and satisfy the Agarwal-Tara criterion for non-classicality, which only depends on the number of vertices of the hypergraphs. We also point out that coherence is observed in the phase quadrature.