About ring structures on the set of integers
D. Yu. Artemov Moscow State Pedagogical University
Abstract:
It is well known that the ring of integers
$\mathbb{Z}$ is an
$E$-ring, therefore it is possible to define unique (up to isomorphism) structure of a ring with identity on the additive group
$\mathbb{Z}$. A natural question arises about the uniqueness of the ring structure with identity constructed on a multiplicative monoid
$\mathbb{Z}$. It is shown in this paper that this question is solved negatively. Moreover, a method of construction new various ring structures on the multiplicative monoid
$\mathbb{Z}$ by dint of multiplicative automorphisms was developed and described. The concept of basis was introduced for the multiplicative monoid
$\mathbb{Z}$, and it was shown that there are no bases (up to sign) that are differ to a basis consists of all prime numbers, and bases that are obtain of that basis by a permutations of its elements. The example of construction a new ring structure on the set
$\mathbb{Z}$ for fixed standart multiplication is given in the end of this paper. The new addition on the multiplicative monoid
$\mathbb{Z}$ is obtained by a permutation of prime numbers (it is
$2\mapsto 3\mapsto 5\mapsto 2$ permutation in the detailed example). From the results obtained in the paper it follows in particular, that the ring
$\mathbb{Z}$ is not an unique addition ring (UA-ring).
Bibliography: 15 titles.
Keywords:
ring of integers, $E$-ring, additive group, unique addition ring, multiplicative semigroup of a ring, monoid.
UDC:
512.536.2
Received: 04.02.2017
Accepted: 14.06.2017
DOI:
10.22405/2226-8383-2017-18-2-6-17
Fulltext:
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