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On the structure of Archimedean $f$-rings
A. G. Kusraeva, B. B. Tasoevab a North-Caucasus Center for Mathematical Research VSC RAS, 22 Marcus St., Vladikavkaz 362027, Russia
b Southern Mathematical Institute VSC RAS, 22 Marcus St., Vladikavkaz 362027, Russia
Abstract:
It is proved that the Boolean valued representation of a Dedekind complete $f$-ring is either the group of integers with zero multiplication, or the ring of integers, or the additive groups of reals with zero multiplication, or the ring of reals. Correspondingly, the Dedekind completion of an Archimedean $f$-ring admits a decomposition into the direct sum of for polars: singular $\ell$-group and an erased vector lattice, both with zero multiplication, a singular $f$-rings and an erased $f$-algebra. A corollary on a functional representation of universally complete $f$-rings is also given.
Key words:
vector lattice, $f$-ring, $f$-algebra, Boolean valued representation, singular $f$-ring.
Received: 14.10.2021
Citation:
A. G. Kusraev, B. B. Tasoev, “On the structure of Archimedean $f$-rings”, Vladikavkaz. Mat. Zh., 23:4 (2021), 112–114
Linking options:
https://www.mathnet.ru/eng/vmj791 https://www.mathnet.ru/eng/vmj/v23/i4/p112
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Abstract page: | 102 | Full-text PDF : | 23 | References: | 22 |
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