Please use this identifier to cite or link to this item: http://elar.uspu.ru/handle/uspu/6686
Title: Lattice definability of certain matrix rings
Authors: Korobkov, S. S.
Issue Date: 2017
Publisher: PU TURPION LTD
Abstract: Let R = M-n(K) be the ring of square matrices of order n >= 2 over the ring K = Z/p(k)Z, where p is a prime number, k is an element of N. Let R' be an arbitrary associative ring. It is proved that the subring lattices of the rings R and R' are isomorphic if and only if the rings R and R' are themselves isomorphic. In other words, the lattice definability of the matrix ring M-n(K) in the class of all associative rings is proved. The lattice definability of a ring decomposable into a direct (ring) sum of matrix rings is also proved. The results obtained are important for the study of lattice isomorphisms of finite rings.
Keywords: LATTICE ISOMORPHISMS OF ASSOCIATIVE RINGS
MATRIX RINGS
GALOIS RINGS
URI: http://elar.uspu.ru/handle/uspu/6686
DOI: 10.1070/SM8654
Appears in Collections:Научные публикации, проиндексированные в Scopus и Web of Science

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