- Advances in the Theory of Nonlinear Analysis and its Application
- Vol: 6 Issue: 1
- Differentiable functions in a three-dimensional associative noncommutative algebra
Differentiable functions in a three-dimensional associative noncommutative algebra
Authors : Tetiana KUZMENKO, Vitalii SHPAKİVSKYİ
Pages : 66-73
Doi:10.31197/atnaa.912344
View : 5 | Download : 2
Publication Date : 2022-03-31
Article Type : Research
Abstract :We consider a three-dimensional associative noncommutative algebra Ã2 over the field C, which contains the algebra of bicomplex numbers B(C) as a subalgebra. In this paper we consider functions of the form Φ(ζ)=f1(ξ1, ξ2,ξ3)I1+ f2(ξ1, ξ2,ξ3)I2+ f3(ξ1, ξ2,ξ3)ρ of the variable ζ= ξ1I1+ ξ2I2+ ξ3ρ, where ξ1, ξ2, ξ3 are independent complex variables and f1, f2, f3 are holomorphic functions of three complex variables. We construct in an explicit form all functions defined by equalities dΦ =dζ·Φ´(ζ) or dΦ = Φ´(ζ) ·dζ. The obtained descriptions we apply to representation of the mentioned class of functions by series. Also we established integral representations of these functions.Keywords : noncommutative algebra, differentiable function, Cauchy-Riemann conditions, constructive description, power series, integral representation