A Casimir operator for a Calogero W algebra

Abstract

We investigate the nonlinear algebra W3 generated by the 9 functionally independent permutation-symmetric operators in the three-particle rational quantum Calogero model. Decoupling the center of mass, we pass to a smaller algebra W'3 generated by 7 operators, which fall into a spin-1 and a spin-32 representation of the conformal sl(2) subalgebra. The commutators of the spin-32 generators with each other are quadratic in the spin-1 generators, with a central term depending on the Calogero coupling. One expects this algebra to feature three Casimir operators, and we construct the lowest one explicitly in terms of Weyl-ordered products of the 7 generators. It is a polynomial of degree 6 in these generators, with coefficients being up to quartic in and quadratic polynomials in the Calogero coupling 2g(g-1). Putting back the center of mass, our Casimir operator for W3 is a degree-9 polynomial in the 9 generators. The computations require the evaluation of nested Weyl orderings. The classical and free-particle limits are also given. Our scheme can be extended to any finite number N of Calogero particles and the corresponding nonlinear algebras WN and W'N.