Sharp Hardy's inequality for orthogonal expansions in Hp spaces

Abstract

Hardy's inequality on Hp spaces, p∈(0,1], in the context of orthogonal expansions is investigated for general basis on a subset of Rd with Lebesgue measure. The obtained result is applied to various Hermite, Laguerre, and Jacobi expansions. For that purpose some delicate estimates of the higher order derivatives for the underlying functions and of the associated heat kernels are proved. Moreover, sharpness of studied Hardy's inequalities is justified by a construction of an explicit counterexample, which is adjusted to all considered settings.