Scaling of entanglement entropy and correlations in the variable-range extended Ising model

Abstract

We study the two-point correlation functions and the bipartite entanglement in the ground state of the exactly-solvable variable-range extended Ising model of qubits in the presence of a transverse field on a one-dimensional lattice. We introduce the variation in the range of interaction by varying the coordination number, Z, of each qubit, where the interaction strength between a pair of qubits at a distance r varies as r-α. We show that the algebraic nature of the correlation functions is present only up to r=Z, above which it exhibits short-range exponential scaling. We also show that at the critical point, the bipartite entanglement exhibits a power-law decrease (-γ) with increasing coordination number irrespective of the partition size and the value of α for α>1. We further consider a sudden quench of the system starting from the ground state of the infinite-field limit of the system Hamiltonian via turning on the critical Hamiltonian, and demonstrate that the long-time averaged bipartite entanglement exhibits a qualitatively similar variation (-γ) with Z.

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