Variations on a Formula of Selberg

α∈R (∣∣〈ρk, α∨〉+ kα + 1 2kα/2∣∣)! (∣∣〈ρk, α∨〉+ 1 2kα/2∣∣)! • Also in 1982, A. Koranyi uses the Selberg formula to compute the volumes of bounded symmetric domains. • In 1987, K. Aomoto studies a slight generalization of the Selberg integral arising from work on Fock space representations of the Virasoro algebra. Here a connection with hypergeometric functions, specifically Jacobi polynomials is made. • The Selberg integral formula also found its way (indirectly) into Bernstein degree calculations by H. Ochiai and his collaborators. (This is also the route by which I bumped into the Selberg integral.)