Calogero–Moser–Sutherland model

Calogero–Moser–Sutherland models (short CMS models) are a type of integrable one-dimensional many-body systems, which can be studied with exact results both from the classical and quantum perspective. Such models describe pointlike particles on a line or a circle with quadratic or inverse quadratic interactions between them. CMS models are named after Francesco Calogero, Jürgen Moser and Bill Sutherland. Calogero, in 1971, first considered the quantum model on a line with both a quadratic and inverse quadratic interaction. He computed the energy spectrum and described soliton scattering without the quadratic term. Sutherland, also in 1971, further considered the quantum model on the circle and modified the inverse quadratic interaction to include the sine. He also computed the energy spectrum and developed an algorithm to obtain the corresponding eigenfunctions. Moser, later in 1975, proved the integrability of both systems using Lax pairs and solved the scattering problem. A relativistic generalization of CMS models was later developed with Ruijsenaars–Schneider models (short RS models).Hallnäs 2023, p. 1

Description

For $N$ particles on the real line $\mathbb{R}$ , the Hamiltonian of the CMS model is given by:Hallnäs 2023, Equation (1)

: $H
=\frac{1}{2m}\sum_{i=1}^Np_i^2
+\frac{g^2}{m}\sum_{1\leq i$

Different potentials lead to different CMS models, which the four types most often considered being:Hallnäs 2023, Equation (2), (4), (5) and (6)

Type I/rational:
: $V(x)$

=\frac{1}{x^2}.

Type II/hyperbolic:
: $V(x)$

=\frac{a^2}{4\sinh(ax/2)^2}, a>0.

Type III/trigonometric:
: $V(x)$

=\frac{a^2}{4\sin(ax/2)^2}.

Type IV/elliptic:
: $V(x)$

=\weierp(x;\omega_1,\omega_2).

Literature

{{cite journal |last=Calogero |first=Francesco |author-link=Francesco Calogero |date=March 1971 |title=Solution of the One-Dimensional N-Body Problems with Quadratic and/or Inversely Quadratic Pair Potentials |journal=Journal of Mathematical Physics |volume=12 |issue=3 |pages=195–456 |arxiv= |doi=10.1063/1.1665604|bibcode=1971JMP....12..419C }}
{{cite journal |last=Sutherland |first=Bill |author-link=T. Bill Sutherland |date=1971 |title=Exact Results for a Quantum Many-Body Problem in One Dimension |journal=Physical Review A |volume=4 |issue=5 |pages=2019–2021 |arxiv= |doi=10.1103/PhysRevA.4.2019|bibcode=1971PhRvA...4.2019S }}
{{cite journal |last=Moser |first=Jürgen |author-link=Jürgen Moser |date=1975 |title=Three integrable Hamiltonian systems connected with isospectral deformation |journal=Advances in Mathematics |volume=16 |issue=2 |pages=197–220 |arxiv= |doi=10.1016/0001-8708(75)90151-6}}
{{cite book |last=Arutyunov |first=Gleb |title=Elements of Classical and Quantum Integrable Systems |series=UNITEXT for Physics |date=2019-07-23 |publisher=Springer Nature |isbn=978-3-03024197-1 |location= |language=en |doi=10.1007/978-3-030-24198-8 |bibcode=2019ecqi.book.....A }}
{{cite arXiv |eprint=2312.12932 |class= math-ph|first=Martin |last=Hallnäs |title=Calogero-Moser-Sutherland systems |date=2023-12-20}}

References

Category: Mathematical physics

Category: Dynamical systems