Constructive description of monogenic functions in a finite-dimensional commutative associative algebra

Abstract

Let Anm be an arbitrary n-dimensional commutative associative algebra over the field of complex numbers with m idempotents. Let e1=1,e2,e3 be elements of Anm which are linearly independent over the field of real numbers. We consider monogenic (i.e. continuous and differentiable in the sense of Gateaux) functions of the variable xe1+ye2+ze3 where x,y,z are real, and obtain a constructive description of all mentioned functions by means of holomorphic functions of complex variables. It follows from this description that monogenic functions have Gateaux derivatives of all orders.