A quaternionic fractional Borel-Pompeiu type formula

Abstract

Quaternionic analysis relies heavily on results on functions defined on domains in R4 (or R3) with values in H. This theory is centered around the concept of -hyperholomorphic functions i.e., null-solutions of the -Fueter operator related to a so-called structural set of H4. Fractional calculus, involving derivatives-integrals of arbitrary real or complex order, is the natural generalization of the classical calculus, which in the latter years became a well-suited tool by many researchers working in several branches of science and engineering. In theoretical setting, associated with a fractional -Fueter operator that depends on an additional vector of complex parameters with fractional real parts, this paper establishes a fractional analogue of Borel-Pompeiu formula as a first step to develop a fractional -hyperholomorphic function theory and the related operator calculus.