Infinitesimals via Cauchy sequences: Refining the classical equivalence

Infinitesimals via Cauchy sequences: Refining the classical equivalence

A refinement of the classic equivalence relation among Cauchy sequences yields a useful infinitesimal-enriched number system. Such an approach can be seen as formalizing Cauchy’s sentiment that a null sequence “becomes” an infinitesimal. We signal a little-noticed construction of a system with infin...

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Veröffentlicht in:Open mathematics (Warsaw, Poland) Poland), 2021-06, Vol.19 (1), p.477-482
Hauptverfasser: Bottazzi, Emanuele, Katz, Mikhail G.
Format: Artikel
Sprache:eng
Schlagworte:
03H05
26E35
Cauchy sequence
Equivalence
hyperreal
infinitesimal
Number systems
Sequences
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Zusammenfassung:A refinement of the classic equivalence relation among Cauchy sequences yields a useful infinitesimal-enriched number system. Such an approach can be seen as formalizing Cauchy’s sentiment that a null sequence “becomes” an infinitesimal. We signal a little-noticed construction of a system with infinitesimals in a 1910 publication by Giuseppe Peano, reversing his earlier endorsement of Cantor’s belittling of infinitesimals.
ISSN:2391-5455
2391-5455
DOI:10.1515/math-2021-0048