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Projections of Finite One-Generated Rings with IdentityAssociative rings R and R' are said to be lattice-isomorphic if their subring lattices L(R) and L
Lattice definability of certain matrix rings is a prime number, k is an element of N. Let R' be an arbitrary associative ring. It is proved
Lattice definability of certain matrix rings is a prime number, k is an element of N. Let R' be an arbitrary associative ring. It is proved
Lattice definability of certain matrix rings is a prime number, k is an element of N. Let R' be an arbitrary associative ring. It is proved
Projections of Galois RingsLet R and R (phi) be associative rings with isomorphic subring lattices and phi be a lattice
Projections of Galois RingsLet R and R (phi) be associative rings with isomorphic subring lattices and phi be a lattice
Projections of Finite One-Generated Rings with IdentityAssociative rings R and R' are said to be lattice-isomorphic if their subring lattices L(R) and L
Projections of Finite Commutative Rings with IdentityAssociative rings R and R′ are said to be lattice-isomorphic if their subring lattices L(R) and L
Finite-dimensional homogeneously simple algebras of associative type ring of associative type over an algebraically closed field is isomorphic to a group algebra. © 2010
Projections of Finite Commutative Rings with IdentityAssociative rings R and R′ are said to be lattice-isomorphic if their subring lattices L(R) and L
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