On scaled hyperbolic numbers induced by scaled hyperbolic rings
Abstract
In this paper, we generalize the well-known hyperbolic numbers to certain numeric structures scaled by the real numbers. Under our scaling of R, the usual hyperbolic numbers are understood to be our 1-scaled hyperbolic numbers. If a scale t is not positive in R, then our t-scaled hyperbolic numbers have similar numerical structures with those of the complex numbers, however, if a scale is positive in R, then their numerical properties are similar to those of the classical hyperbolic numbers. We here understand scaled-hyperbolic numbers as elements of the scaled-hypercomplex rings \Ht\t∈ R, introduced in [1]. This scaled-hyperbolic analysis is done by algebra, analysis, operator theory, operator-algebra theory and free probability on scaled-hypercomplex numbers
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