Form Factors of Branch-Point Twist Fields in Quantum Integrable Models and Entanglement Entropy

We consider the entanglement entropy for a free U(1) theory in 3+1 dimensions in the extended Hilbert space definition. By taking the continuum limit carefully we obtain a replica trick path integral which calculates this entanglement entropy. The path integral is gauge invariant, with a gauge fixing delta function accompanied by a Faddeev -Popov determinant. For a spherical region it follows that the result for the logarithmic term in the entanglement, which is universal, is given by the a anomaly coefficient. We also consider the extractable part of the entanglement, which corresponds to the number of Bell pairs which can be obtained from entanglement distillation or dilution. For a spherical region we show that the coefficient of the logarithmic term for the extractable part is different from the extended Hilbert space result. We argue that the two results will differ in general, and this difference is accounted for by a massless scalar living on the boundary of the region of interest.

Section: Jhep02(2017)101mentioning

confidence: 96%

“…one needs to continue the function Z(n) for non-integer values, and then take the derivative. Subtleties may arise in this continuation, see [22] for a discussion, but we ignore them here. Note that the above description is general and immediately applies to the U(1) theory as well.…”

Section: The Replica Trickmentioning

confidence: 99%

Entanglement entropy in (3 + 1)-d free U(1) gauge theory

Soni

Trivedi

2017

“…These spin structures are the special "diagonal" higher-genus spin structures that obey the replica symmetry, namely those of the type α diag = (α, α, · · · , α), and β diag = (β, β, · · · , β), where (α, β) is the spin structure on the original torus. 4 The higher-genus answer is expressed in terms of Siegel Θ-functions with the special characteristics α diag β diag . The twist-operator approach involves computing two-point functions on the original torus, and the answer is expressed in terms of Jacobi θ-functions with spin structure (α, β).…”

Section: Jhep01(2018)005mentioning

confidence: 99%

“…3 The partition function vanishes for odd spin structures, so only the 2 n−1 (2 n + 1) even spin structures contribute to this sum. 4 We will often need to distinguish the original torus from the replica surface which is an n-fold copy of the original torus glued pairwise along a cut.…”

Section: Jhep01(2018)005mentioning

confidence: 99%

Entanglement, replicas, and Thetas

Mukhi

Murthy

2018

Abstract:We compute the single-interval Rényi entropy (replica partition function) for free fermions in 1+1d at finite temperature and finite spatial size by two methods: (i) using the higher-genus partition function on the replica Riemann surface, and (ii) using twist operators on the torus. We compare the two answers for a restricted set of spin structures, leading to a non-trivial proposed equivalence between higher-genus Siegel Θ-functions and Jacobi θ-functions. We exhibit this proposal and provide substantial evidence for it. The resulting expressions can be elegantly written in terms of Jacobi forms. Thereafter we argue that the correct Rényi entropy for modular-invariant free-fermion theories, such as the Ising model and the Dirac CFT, is given by the higher-genus computation summed over all spin structures. The result satisfies the physical checks of modular covariance, the thermal entropy relation, and Bose-Fermi equivalence.

“…If we denote q i = diag(q i ) k , then the two point function of light operators is only non-vanishing if 31) and if this condition is satisfied the correlation function equals…”

Section: Jhep07(2015)168mentioning

confidence: 99%

Higher spin entanglement and W N $$ {\mathcal{W}}_{\mathrm{N}} $$ conformal blocks

Boer

Castro

Hijano

et al. 2015

158

Two-dimensional conformal field theories with extended W-symmetry algebras have dual descriptions in terms of weakly coupled higher spin gravity in AdS 3 at large central charge. Observables that can be computed and compared in the two descriptions include Rényi and entanglement entropies, and correlation functions of local operators. We develop techniques for computing these, in a manner that sheds light on when and why one can expect agreement between such quantities on each side of the duality. We set up the computation of excited state Rényi entropies in the bulk in terms of Chern-Simons connections, and show how this directly parallels the CFT computation of correlation functions. More generally, we consider the vacuum conformal block for general operators with ∆ ∼ c. When two of the operators obey ∆ c ≪ 1, we show by explicit computation that the vacuum conformal block is computed by a bulk Wilson line probing an asymptotically AdS 3 background with higher spin fields excited, the latter emerging as the effective bulk description of the excited state produced by the heavy operators. Among other things, this puts a previous proposal for computing higher spin entanglement entropy via Wilson lines on firmer footing, and clarifies its relation to CFT. We also study the corresponding computation in Toda theory and find that this provides yet another independent way to arrive at the same result.