Multicomplex Ideals, Modules and Hilbert Spaces

Abstract

In this article we study some algebraic aspects of multicomplex numbers Mn. For n≥ 2 a canonical representation is defined in terms of the multiplication of n-1 idempotent elements. This representation facilitates computations in this algebra and makes it possible to introduce a generalized conjugacy n, i.e. a composition of the n multicomplex conjugates n:=1·s n, as well as a multicomplex norm. The ideals of the ring of multicomplex numbers are then studied in details, free Mn-modules and their linear operators are considered and, finally, we develop Hilbert spaces on the multicomplex algebra.

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