The Opdam–Cherednik kernel is the Laplace transform of a positive measure
We prove that the Opdam–Cherednik kernel, also known as the nonsymmetric Opdam hypergeometric function, can be written as the Laplace transform of a positive measure supported on the convex hull of the Weyl group orbit of its argument. As a consequence, the trigonometric Dunkl intertwining operator is positivity preserving. The main ingredient in the proof is a new formula for the Opdam–Cherednik kernel as a degeneration of nonsymmetric Macdonald polynomials. As a further application, we prove majorization inequalities for Macdonald polynomials and Heckman–Opdam hypergeometric functions associated with arbitrary root systems.
This is joint work with Colin McSwiggen (Academia Sinica), arXiv:2606.15185.

