Элементарная Эквивалентность Групп Шевалле Над Локальными Кольцами

In this paper we study the Diophantine problem in the classical matrix groups , , and , , over an associative ring with identity. We show that if is one of these groups, then the Diophantine problem in is polynomial-time equivalent (more precisely, Karp equivalent) to the Diophantine problem in . When we assume that is commutative. Similar results hold for and provided has no zero divisors (for the ring is not assumed to be commutative).

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Isomorphisms and elementary equivalence of Chevalley groups over commutative rings

Bunina¹

2019

Sb. Math.

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It is proved that two Chevalley groups with indecomposable root systems of rank over commutative rings (which contain in addition for the types , , , , and , and for the type ) are isomorphic or elementarily equivalent if and only if the corresponding root systems coincide, the weight lattices of the representation of the Lie algebra coincide, and the rings are isomorphic or elementarily equivalent, respectively. The isomorphisms of adjoint (elementary) Chevalley groups over the rings of the above types are also described. Bibliography: 25 titles.

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Элементарная Эквивалентность Групп Шевалле Над Локальными Кольцами

Cited by 6 publications

References 24 publications

A Criterion of Elementary Equivalence of Automorphism Groups of Unreduced Abelian p-Groups

A Criterion of Elementary Equivalence of Automorphism Groups of Unreduced Abelian p-Groups

The Diophantine problem in the classical matrix groups

Isomorphisms and elementary equivalence of Chevalley groups over commutative rings

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