Orthogonality of the big -1 Jacobi polynomials for non-standard parameters

Abstract

The big -1 Jacobi polynomials (Qn(0)(x;α,β,c))n have been classically defined for α,β∈(-1,∞), c∈(-1,1). We extend this family so that wider sets of parameters are allowed, i.e., they are non-standard. Assuming initial conditions Q(0)0(x)=1, Q(0)-1(x)=0, we consider the big -1 Jacobi polynomials as monic orthogonal polynomials which therefore satisfy the following three-term recurrence relation \[ xQ(0)n(x)=Q(0)n+1(x)+bn Q(0)n(x)+ un Q(0)n-1(x), n=0, 1, 2,…. \] For standard parameters, the coefficients un>0 for all n. We discuss the situation where Favard's theorem cannot be directly applied for some positive integer n such that un=0. We express the big -1 Jacobi polynomials for non-standard parameters as a product of two polynomials. Using this factorization, we obtain a bilinear form with respect to which these polynomials are orthogonal.