Some global operators and the material derivative

Abstract

The theory of the operator G(x) = |x|2 ∂ ∂ x0 + x Σj=1n xj ∂ ∂ xj is deeply associated with the slice monogenic function theory and has grown in recent years. In particular, for n=3 the quaternionic version of G has been recently used to study the quaternionic slice regular function theory. This work extends the study of the G operator in two senses: a) Clifford's analysis structure. The function theory induced by the operator align* Ha (x) = a ( x) ∂ ∂ x0 - Σi=1n ( Σj=1n aj ( x) ∂ (a-1)i∂ yj a ( x) ) ∂∂ xi, align* where a is a function with certain properties with domain in Rn+1 is presented extending the already known results of the G. Also some properties of the material derivative are presented as consequences of function theory induced by Ha. b) Structure of quaternionic analysis. In particular, the case n=3 is approached from the point of view of quaternionic analysis.