TY - JOUR
TI - Divisibility in beta βN and *N
AU - Šobot, Boris
TI - Divisibility in beta βN and *N
AB - The paper first covers several properties of the extension of the divisibility relation to a set *N of nonstandard integers, including an analogue of the basic theorem of arithmetic. After that, a connection is established with the divisibility in the Stone–Čech compactification βN, proving that the divisibility of ultrafilters introduced by the author is equivalent to divisibility of some elements belonging to their respective monads in an enlargement. Some earlier results on ultrafilters on lower levels on the divisibility hierarchy are illuminated by nonstandard methods. Using limits by ultrafilters we obtain results on ultrafilters above these finite levels, showing that for them a distribution by levels is not possible.
VL - 2019
IS - Number 54
PY - 2019
SN - 0137-2904
C1 - 2084-2589
SP - 65
EP - 82
DO - 10.4467/20842589RM.19.003.10651
UR - https://ejournals.eu/en/journal/reports-on-mathematical-logic/article/divisibility-in-beta-bn-and-n
KW - divisibility
KW - nonstandard integer
KW - Stone-Cech compactification
KW - ultrafilter