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Alternative Mathematics without Actual Infinity

General Mathematics 2012-06-14 v2

Abstract

An alternative mathematics based on qualitative plurality of finiteness is developed to make non-standard mathematics independent of infinite set theory. The vague concept "accessibility" is used coherently within finite set theory whose separation axiom is restricted to definite objective conditions. The weak equivalence relations are defined as binary relations with sorites phenomena. Continua are collection with weak equivalence relations called indistinguishability. The points of continua are the proper classes of mutually indistinguishable elements and have identities with sorites paradox. Four continua formed by huge binary words are examined as a new type of continua. Ascoli-Arzela type theorem is given as an example indicating the feasibility of treating function spaces. The real numbers are defined to be the points on the linear continuum and have indefiniteness. Exponentiation is introduced by the Eulerian style and basic properties are established. Basic calculus is developed and the differentiability is captured by the behavior on a point. Main tools of Lebesgue measure theory is obtained in a similar way as Loeb measure. Differences from the current mathematics are examined, such as the indefiniteness of natural numbers, qualitative plurality of finiteness, mathematical usage of vague concepts, the continuum as a primary inexhaustible entity and the hitherto disregarded aspect of "internal measurement" in mathematics.

Keywords

Cite

@article{arxiv.1204.2193,
  title  = {Alternative Mathematics without Actual Infinity},
  author = {Toru Tsujishita},
  journal= {arXiv preprint arXiv:1204.2193},
  year   = {2012}
}

Comments

159 pages, 5 figures. Minor modifications of the first version: Correction of mathematical errors in Section 1.2.5 and in Section 4.2 and of many typos, some improvement in Section 10.4 and index pages are added

R2 v1 2026-06-21T20:47:28.056Z