Spaces of continuous and bounded functions over the field of geometric complex numbers
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2013Access
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Following Grossman and Katz (Non-Newtonian Calculus, 1972), we construct the sets and of geometric complex-valued bounded and continuous functions, where A denotes the compact subset of the complex plane a,. We show that the sets and of complex-valued bounded and continuous functions form a vector space with respect to the addition and scalar multiplication in the sense of multiplicative calculus. Finally, we prove that and are complete metric spaces.