Logarithmic divergence of the block entanglement entropy for the ferromagnetic Heisenberg model

Abstract

Recent studies have shown that logarithmic divergence of entanglement entropy as function of size of a subsystem is a signature of criticality in quantum models. We demonstrate that the ground state entanglement entropy of n sites for ferromagnetic Heisenberg spin-1/2 chain of the length L in a sector with fixed magnetization y per site grows as 1/22 n(L-n)LC(y), where C(y)=2π e(1/4-y2)

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