Juan C. Lopez Vieyra, Alexander Turbiner
Published 2003-09-10Version 1
It is shown that the $F_4$ rational and trigonometric integrable systems are exactly-solvable for {\it arbitrary} values of the coupling constants. Their spectra are found explicitly while eigenfunctions are obtained by pure algebraic means. For both systems new variables are introduced in which the Hamiltonian has an algebraic form being also (block)-triangular. These variables are a certain invariants of the $F_4$ Weyl group. Both Hamiltonians preserve the same (minimal) flag of spaces of polynomials, which is found explicitly.
Comments: 7 pages, LaTeX, submitted to Proceedings of the 12th International Colloquium Quantum Group and Integrable Systems, Prague, 12-14 June, 2003
Journal: Czech.J.Phys. 53 (2003) 1061-1067
Quantum Integrable Systems on a Classical Integrable Background
Root patterns and energy spectra of quantum integrable systems without $U(1)$ symmetry: antiperiodic $XXZ$ spin chain
The higher order $q$-Dolan-Grady relations and quantum integrable systems
