Physics:Inozemtsev model

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Short description: Statistical lattice model with long-range interactions

In statistical physics, the Inozemtsev model is a spin chain model, defined on a one-dimensional, periodic lattice. Unlike the prototypical Heisenberg spin chain, which only includes interactions between neighboring sites of the lattice, the Inozemtsev model has long-range interactions, that is, interactions between any pair of sites, regardless of the distance between them.

It was introduced in 1990 by Vladimir Inozemtsev as a model which interpolates between the Heisenberg XXX model and the Haldane–Shastry model.[1] Like those models, the Inozemtsev model is exactly solvable.

Formulation

For a chain with [math]\displaystyle{ L }[/math] spin 1/2 sites, the quantum phase space is described by the Hilbert space [math]\displaystyle{ \mathcal{H} = (\mathbb{C}^2)^{\otimes L} }[/math]. The (elliptic) Inozemtsev model is given by the (unnormalised) Hamiltonian[2] [math]\displaystyle{ H_u = \sum_{j \lt k}^L \wp(j - k)\frac{1 - \vec \sigma_j \otimes \vec \sigma_k}{2} }[/math] where [math]\displaystyle{ \wp(z) }[/math] is the Weierstrass elliptic function and [math]\displaystyle{ \vec \sigma_j }[/math] is the Pauli vector acting on the [math]\displaystyle{ j }[/math]th copy of the tensor product Hilbert space.

More precisely, the parameters used for the Weierstrass p are [math]\displaystyle{ \wp(z) = \wp(z;L, i\omega) = \frac{1}{z^2} + \sum_{m,n}'\left(\frac{1}{(z - mL - in\omega)^2} - \frac{1}{(mL + in\omega)^2}\right) }[/math] for [math]\displaystyle{ \omega }[/math] a positive real number. The notation [math]\displaystyle{ \sum' }[/math] means sum over all pairs of integers except [math]\displaystyle{ (m,n) = (0,0) }[/math]. This ensures that the function is [math]\displaystyle{ L }[/math]-periodic in the real direction, and is real for real values of [math]\displaystyle{ z }[/math].

Exact solution

The system has been exactly solved by means of a Bethe ansatz method. The Bethe ansatz equations were found by Inozemtsev.[3][4] In fact, the model was first solved in the infinite size limit.[5]

AdS/CFT correspondence

The model can be used to understand certain aspects of the AdS/CFT correspondence proposed by Maldacena. Specifically, integrability techniques have turned out to be useful for an 'integrable' instance of the correspondence. On the string theory side of the correspondence, one has a type IIB superstring on [math]\displaystyle{ \mathrm{AdS}_5 \times \mathrm{S}^5 }[/math], the product of five-dimensional Anti-de Sitter space with the five-dimensional sphere. On the conformal field theory (CFT) side one has N = 4 supersymmetric Yang–Mills theory (N = 4 SYM) on four-dimensional space.

Spin chains have turned out to be useful for computing specific anomalous dimensions on the CFT side, which can then provide evidence for the correspondence if matching observables are computed on the string theory side. In the so-called 'planar limit' or 'large N' limit of N = 4 SYM, in which the number of colors [math]\displaystyle{ N }[/math], which parametrizes the gauge group [math]\displaystyle{ SU(N) }[/math], is sent to infinity, determining one-loop anomalous dimensions becomes equivalent to the problem of diagonalizing an appropriate spin chain. The Inozemtsev model is one such model which has been useful in determining these quantities.[6]

See also

References

  1. Inozemtsev, V. I. (1 June 1990). "On the connection between the one-dimensionalS=1/2 Heisenberg chain and Haldane-Shastry model" (in en). Journal of Statistical Physics 59 (5): 1143–1155. doi:10.1007/BF01334745. ISSN 1572-9613. https://link.springer.com/article/10.1007/BF01334745. Retrieved 18 July 2023. 
  2. Klabbers, Rob; Lamers, Jules (March 2022). "How Coordinate Bethe Ansatz Works for Inozemtsev Model". Communications in Mathematical Physics 390 (2): 827–905. doi:10.1007/s00220-021-04281-x. 
  3. Inozemtsev, V I (21 August 1995). "On the spectrum of S= 1/2 XXX Heisenberg chain with elliptic exchange". Journal of Physics A: Mathematical and General 28 (16): L439–L445. doi:10.1088/0305-4470/28/16/004. 
  4. Inozemtsev, V.I. (2000). "Bethe-ansatz equations for quantum Heisenberg chains with elliptic exchange". Regular and Chaotic Dynamics 5 (3): 243. doi:10.1070/RD2000v005n03ABEH000147. 
  5. Inozemtsev, V. I. (January 1992). "The extended Bethe ansatz for infinite $S=1/2$ quantum spin chains with non-nearest-neighbor interaction". Communications in Mathematical Physics 148 (2): 359–376. doi:10.1007/BF02100866. ISSN 0010-3616. https://projecteuclid.org/journals/communications-in-mathematical-physics/volume-148/issue-2/The-extended-Bethe-ansatz-for-infinite-S1-2-quantum-spin/cmp/1104250955.full. 
  6. Serban, D; Staudacher, M (2 June 2004). "Planar N =4 gauge theory and the Inozemtsev long range spin chain". Journal of High Energy Physics 2004 (6): 001. doi:10.1088/1126-6708/2004/06/001.