Discrete Harmonic Analysis associated with Jacobi expansions III: the Littlewood-Paley-Stein gk-functions and the Laplace type multipliers

Abstract

The research about Harmonic Analysis associated with Jacobi expansions carried out in ACL-JacI and ACL-JacII is continued in this paper. Given the operator J(α,β)=J(α,β)-I, where J(α,β) is the three-term recurrence relation for the normalized Jacobi polynomials and I is the identity operator, we define the corresponding Littlewood-Paley-Stein gk(α,β)-functions associated with it and we prove an equivalence of norms with weights for them. As a consequence, we deduce a result for Laplace type multipliers.