Integral theorems for monogenic functions in commutative algebras

Abstract

Let Anm be an arbitrary n-dimensional commutative associative algebra over the field of complex numbers with m idempotents. Let e1=1,e2,…,ek with 2≤ k≤ 2n 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 Σj=1k xj\,ej, where x1,x2,…,xk are real, and we prove curvilinear analogues of the Cauchy integral theorem, the Morera theorem and the Cauchy integral formula in k-dimensional (2≤ k≤ 2n) real subset of the algebra Anm. The present article is generalized of the author's paper [1], where mentioned results are obtained for k=3.