Distributions associated to homogeneous distributions

Abstract

In this paper we continue to study quasi associated homogeneous distributions (generalized functions) which were introduced in the paper by V.M. Shelkovich, Associated and quasi associated homogeneous distributions (generalized functions), J. Math. An. Appl., 338, (2008), 48-70. [arXiv:math/0608669]. For the multidimensional case we give the characterization of these distributions in the terms of the dilatation operator Ua (defined as Uaf(x)=f(ax), x∈ n, a >0) and its generator Σj=1nxj∂∂ xj. It is proved that fk∈ '(n) is a quasi associated homogeneous distribution of degree λ and of order k if and only if (Σj=1nxj∂∂ xj-λ)k+1fk(x)=0, or if and only if (Ua-aλ I)k+1fk(x)=0, ∀ \, a>0, where I is a unit operator. The structure of a quasi associated homogeneous distribution is described.