Kadell's two conjectures for Macdonald polynomials (Q1815218)

Jack polynomials can be regarded as eigenfunctions of second order differential-difference operators of Calogero-Sutherland-Heckman-Opdam-type which generalize radial parts of Laplace operators on symmetric spaces. This interpretation leads to some properties of anti-symmetric Jack polynomials for negative integral and half-integral parameters \(k\) which were suggested recently by K. Kadell. In this paper related results are presented also for Macdonald polynomials.