Concerning three classes of non-Diophantine arithmetics

Abstract

We present three classes of abstract prearithmetics, \AM\M ≥ 1, \A-M,M\M ≥ 1, and \BM\M > 0. The first one is weakly projective with respect to the nonnegative real Diophantine arithmetic R+=(R+,+,×,≤R+), the second one is weakly projective with respect to the real Diophantine arithmetic R=(R,+,×,≤R), while the third one is projective with respect to the extended real Diophantine arithmetic R=(R,+,×,≤R). In addition, we have that every AM and every BM are a complete totally ordered semiring, while every A-M,M is not. We show that the projection of any series of elements of R+ converges in AM, for any M ≥ 1, and that the projection of any non-oscillating series series of elements of R converges in A-M,M, for any M ≥ 1, and in BM, for all M > 0. We also prove that working in AM and in A-M,M, for any M ≥ 1, and in BM, for all M>0, allows to overcome a version of the paradox of the heap.

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