New characterizations of the ring of the split-complex numbers and the field C of complex numbers and their comparative analyses

Abstract

In this paper, we give a new characterization of the split-complex numbers as a vector space LC2= \xI+yE : x,y ∈ R,\, E2=I \ of operators, where I is the identity operator and E is the unit shift operator that are operating on the space P2 of all real-valued 2-periodic functions. We also characterize the field of the complex number C= \x+yi: x, y ∈ R, i2 =-1 \ as the space of linear operators of the form \xI+yE, E2 = -I \, where I is the identity operator and E the unit shift operator that are regarded as operating on the vector space AP2 of all real-valued 2-antiperiodic functions. In an analogy to the polar form of complex numbers, we form the hyperbolic form of some subset H of the elements of LC2 . We study some properties of the elements of LC2, the trace, the determinant, invertibility conditions, and others. We study some elementary functions defined on subsets of LC2 as compared and contrasted with the usual complex functions. We study properties like continuity, differentiability and define the holomorphic condition of LC2 functions in a different sense than complex functions. We establish the line integrals of the vector-valued functions in LC2 and compare them against the well known results for complex functions of a complex variable.