English

A quaternionic fractional Borel-Pompeiu type formula

Complex Variables 2022-09-27 v2

Abstract

Quaternionic analysis relies heavily on results on functions defined on domains in R4\mathbb R^4 (or R3\mathbb R^3) with values in H\mathbb H. This theory is centered around the concept of ψ\psi-hyperholomorphic functions i.e., null-solutions of the ψ\psi-Fueter operator related to a so-called structural set ψ\psi of H4\mathbb H^4. 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 ψ\psi-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 ψ\psi-hyperholomorphic function theory and the related operator calculus.

Keywords

Cite

@article{arxiv.2109.09604,
  title  = {A quaternionic fractional Borel-Pompeiu type formula},
  author = {José Oscar González-Cervantes and Juan Bory-Reyes},
  journal= {arXiv preprint arXiv:2109.09604},
  year   = {2022}
}
R2 v1 2026-06-24T06:08:43.407Z