Quantum Integrals for a Semi-Infinite q-Boson System with Boundary Interactions ?

@article{vanDiejen2015QuantumIF,
  title={Quantum Integrals for a Semi-Infinite q-Boson System with Boundary Interactions ?},
  author={J. F. van Diejen and E. Emsiz},
  journal={Symmetry Integrability and Geometry-methods and Applications},
  year={2015},
  volume={11},
  pages={037}
}
We provide explicit formulas for the quantum integrals of a semi-infiniteq-boson system with boundary interactions. These operators and their commutativity are deduced from the Pieri formulas for a q! 0 Hall{Littlewood type degeneration of the Macdonald{ Koornwinder polynomials. 
View PDF on arXiv
2 Citations
Background Citations
1

2 Citations

From quantum Bäcklund transforms to topological quantum field theory

We derive the quantum analogue of a Bäcklund transformation for the quantized Ablowitz–Ladik chain, a space discretization of the nonlinear Schrödinger equation. The quantization of the

Harmonic analysis of boxed hyperoctahedral Hall-Littlewood polynomials

References

SHOWING 1-10 OF 29 REFERENCES

Boundary Interactions for the Semi-Infinite q-Boson System and Hyperoctahedral Hall{Littlewood Polynomials ?

We present a semi-infinite q-boson system endowed with a four-parameter boun- dary interaction. The n-particle Hamiltonian is diagonalized by generalized Hall{Littlewood polynomials with

The Semi-Infinite q-Boson System with Boundary Interaction

Upon introducing a one-parameter quadratic deformation of the q-boson algebra and a diagonal perturbation at the end point, we arrive at a semi-infinite q-boson system with a two-parameter boundary

Correlation functions for a strongly correlated boson system

Quantum Inverse Scattering Method and Correlation Functions

One-dimensional Bose-gas One-dimensional Heisenberg magnet Massive Thirring model Classical r-matrix Fundamentals of inverse scattering method Algebraic Bethe ansatz Quantum field theory integral

Quantum inverse scattering method for the q-boson model and symmetric functions

The purpose of this paper is to show that the quantum inverse scattering method for the so-called q-boson model has a nice interpretation in terms of the algebra of symmetric functions. In

Foundations of Quantum Group Theory

Introduction 1. Definition of Hopf algebras 2. Quasitriangular Hopf algebras 3. Quantum enveloping algebras 4. Matrix quantum groups 5. Quantum random walks and combinatorics 6. Bicrossproduct Hopf

Diagonalization of the infinite q-boson system☆

A deformation of affine Hecke algebra and integrable stochastic particle system

We introduce a deformation of the affine Hecke algebra of type GL ?> which describes the commutation relations of the divided difference operators found by Lascoux and Schützenberger and the

Scattering Theory of Discrete (pseudo) Laplacians on a Weyl Chamber

To a crystallographic root system we associate a system of multivariate orthogonal polynomials diagonalizing an integrable system of discrete pseudo Laplacians on the Weyl chamber. We develop the

Scattering theory of discrete (pseudo) Laplacians on a Weyl chamber

To a crystallographic root system we associate a system of multivariate orthogonal polynomials diagonalizing an integrable system of discrete pseudo Laplacians on the Weyl chamber. We develop the