A quaternionic proportional fractional Fueter-type operator calculus
Jos\'e Oscar Gonz\'alez-Cervantes, Juan Bory-Reyes
TL;DR
This paper develops a new quaternionic proportional fractional calculus framework, introducing fractional integrals and derivatives, and establishes fundamental formulas like Borel-Pompeiu and Cauchy integral formulas for these operators.
Contribution
It constructs the first quaternionic proportional fractional Fueter-type operator and proves key integral formulas extending fractional calculus to quaternionic analysis.
Findings
Established quaternionic proportional fractional integral and derivative
Proved a quaternionic proportional fractional Borel-Pompeiu formula
Derived a Cauchy integral type formula for the new operator
Abstract
The main goal of this paper is to construct a proportional analogues of the quaternionic fractional Fueter-type operator recently introduced in the literature. We start by establishing a quaternionic version of the well-known proportional fractional integral and derivative with respect to a real-valued function via the Riemann-Liouville fractional derivative. As a main result, we prove a quaternionic proportional fractional Borel-Pompeiu formula based on a quaternionic proportional fractional Stokes formula. This tool in hand allows us to present a Cauchy integral type formula for the introduced quaternionic proportional fractional Fueter-type operator with respect to a real-valued function.
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Taxonomy
TopicsAlgebraic and Geometric Analysis · Fractional Differential Equations Solutions · Advanced Differential Geometry Research