Monomial and Rodrigues orthogonal polynomials on the cone

Abstract

We study two families of orthogonal polynomials with respect to the weight function w(t)(t2-\|x\|2)μ-12, μ > - 12, on the cone \(x,t): \|x\| t, \, x ∈ Rd, t >0\ in Rd+1. The first family consists of monomial polynomials Vk,n(x,t) = tn-|k| xk + ·s for k ∈ N0d with |k| n, which has the least L2 norm among all polynomials of the form tn-|k| xk + P with P n-1, and we will provide an explicit construction for Vk,n. The second family consists of orthogonal polynomials defined by the Rodrigues type formulas when w is either the Laguerre weight or the Jacobi weight, which satisfies a generating function in both cases. The two families of polynomials are partially biorthogonal.