TY - JOUR
T1 - An integer construction of infinitesimals
T2 - Toward a theory of Eudoxus hyperreals
AU - Borovik, Alexandre
AU - Jin, Renling
AU - Katz, Mikhail G.
PY - 2012
Y1 - 2012
N2 - A construction of the real number system based on almost homomorphisms of the integers ℤ was proposed by Schanuel, Arthan, and others. We combine such a construction with the ultrapower or limit ultrapower construction to construct the hyperreals out of integers. In fact, any hyperreal field, whose universe is a set, can be obtained by such a one-step construction directly out of integers. Even the maximal (i.e., On-saturated) hyperreal number system described by Kanovei and Reeken (2004) and independently by Ehrlich (2012) can be obtained in this fashion, albeit not in NBG. In NBG, it can be obtained via a one-step construction by means of a definable ultrapower (modulo a suitable definable class ultrafilter).
AB - A construction of the real number system based on almost homomorphisms of the integers ℤ was proposed by Schanuel, Arthan, and others. We combine such a construction with the ultrapower or limit ultrapower construction to construct the hyperreals out of integers. In fact, any hyperreal field, whose universe is a set, can be obtained by such a one-step construction directly out of integers. Even the maximal (i.e., On-saturated) hyperreal number system described by Kanovei and Reeken (2004) and independently by Ehrlich (2012) can be obtained in this fashion, albeit not in NBG. In NBG, it can be obtained via a one-step construction by means of a definable ultrapower (modulo a suitable definable class ultrafilter).
KW - Eudoxus
KW - Hyperreals
KW - Infinitesimals
KW - Limit ultrapower
KW - Universal hyperreal field
UR - http://www.scopus.com/inward/record.url?scp=84869391881&partnerID=8YFLogxK
U2 - 10.1215/00294527-1722755
DO - 10.1215/00294527-1722755
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SN - 0029-4527
VL - 53
SP - 557
EP - 570
JO - Notre Dame Journal of Formal Logic
JF - Notre Dame Journal of Formal Logic
IS - 4
ER -