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arxiv: 2110.07627 · v3 · pith:IQBZO3A4new · submitted 2021-10-14 · ✦ hep-th · cond-mat.stat-mech· gr-qc

Entanglement Entropy of Disjoint Spacetime Intervals in Causal Set Theory

classification ✦ hep-th cond-mat.stat-mechgr-qc
keywords causaldisjointentanglemententropydiamonddiamondsspacetimeintervals
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A more complete understanding of entanglement entropy in a covariant manner could inform the search for quantum gravity. We build on work in this direction by extending previous results to disjoint regions in $1+1$D. We investigate the entanglement entropy of a scalar field in disjoint intervals within the causal set framework, using the spacetime commutator and correlator, $i\mathbf{\Delta}$ and $\mathbf{W}$ (or the Pauli-Jordan and Wightman functions), respectively. A new truncation scheme for disjoint causal diamonds is presented, which follows from the single diamond truncation scheme. We investigate setups including two and three disjoint causal diamonds, as well as a single causal diamond that shares a boundary with a larger global causal diamond. In all the cases that we study, our results agree with the expected area laws. In addition, we study the mutual information in the two disjoint diamonds setup. The ease of our calculations indicate our methods to be a useful tool for numerically studying such systems. We end with a discussion of some of the strengths and future applications of the spacetime formulation we use in our entanglement entropy computations, both in causal set theory and in the continuum.

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  1. Spectral Density of the Causal Propagator

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    Conjecture for the asymptotic spectral density of the causal propagator in free scalar QFT, supported by examples, with implications for Lorentzian spectral geometry.