Operator relations characterizing higher-order differential operators

Abstract

Let r be a positive integer, N be a nonnegative integer and ⊂ Rr be a domain. Further, for all multi-indices α ∈ Nr, |α|≤ N, let us consider the partial differential operator Dα defined by \[ Dα= ∂|α|∂ x1α1·s ∂ xrαr, \] where α= (α1, …, αr). Here by definition we mean D0 id. An easy computation shows that if f, g∈ CN() and α ∈ Nr, |α|≤ N, then we have \[ Dα(f· g) = Σβ≤ ααβDβ(f)· Dα - β(g). \] This paper is devoted to the study of identity () in the space C(). More precisely, if r is a positive integer, N is a nonnegative integer and ⊂ Rr is a domain, then we describe those mappings Tα C() C(), α ∈ Nr, |α|≤ N that satisfy identity () for all possible multi-indices α∈ Nr, |α|≤ N. Our main result says that if the domain is C(), then the mappings Tα are of a rather special form. Related results in the space CN() are also presented.