Summation of Divergent Series and Quantum Phase Transitions in Kitaev Chains with Long-Range Hopping

Abstract

We study the quantum phase transitions (QPTs) in extended Kitaev chains with long-range (1/rα) hopping. Formally, there are two QPT points at μ=μ0(α) and μπ(α) (μ is the chemical potential) which correspond to the summations of Σm=1∞m-α and Σm=1∞(-1)m-1m-α, respectively. When α≤0, both the series are divergent and it is usually believed that no QPTs exist. However, we find that there are two QPTs at μ=μ0(0) and μπ(0) for α=0 and one QPT at μ=μπ(α) for α<0. These QPTs are second order. The μ0(0) and μπ(α≤0) correspond to the summations of the divergent series obtained by the analytic continuation of the Riemann ζ function and Dirichlet η function. Moreover, it is found that the quasiparticle energy spectra are discontinue functions of the wave vector k and divide into two branches. This is quite different from that in the case of α>0 and induces topological phases with the winding number ω:=1/2. At the same time, the von Neumann entropy are power law of the subchain length L no matter in the gapped region or not. In addition, we also study the QPTs, topological properties, and von Neumann entropy of the systems with α>0.

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