AbstractWe show that the Nakayama automorphism of a Frobenius algebra R over a field k is independent of the field (Theorem 4). Consequently, the k-dual functor on left R-modules and the bimodule isomorphism type of the k-dual of R, and hence the question of whether R is a symmetric k-algebra, are independent of k. We give a purely ring-theoretic condition that is necessary and sufficient for a finite-dimensional algebra over an infinite field to be a symmetric algebra (Theorem 7)
A Frobenius algebra is a finite-dimensional algebra $A$ which comes equipped with a coassociative, c...
AbstractJ. Kado and K. Oshiro (J. Algebra211 (1999), 384–408) proved the equivalence of (A) the exis...
AbstractLet B̂ be the repetitive algebra of a finite dimensional algebra B over a field K by the B-b...
AbstractWe analyze the homothety types of associative bilinear forms that can occur on a Hopf algebr...
AbstractA Frobenius algebra over a field k is called symmetric if the Nakayama automorphism is an in...
AbstractA Frobenius algebra over a field k is called symmetric if the Nakayama automorphism is an in...
International audienceIn analogy with a recent result of N. Kowalzig and U. Krahmer for twisted Cala...
Connections between annihilators and ideals in Frobenius and symmetric algebras are used to provide ...
Connections between annihilators and ideals in Frobenius and symmetric algebras are used to provide ...
Connections between annihilators and ideals in Frobenius and symmetric algebras are used to provide ...
Connections between annihilators and ideals in Frobenius and symmetric algebras are used to provide ...
Abstract. Connections between annihilators and ideals in Frobenius and symmet-ric algebras are used ...
left Λ-modules and the set of isoclasses of simple Λ modules will be denoted by modΛ and S(Λ), respe...
We give a simple proof, using Auslander-Reiten theory, that the preprojective algebra of a basic her...
Let k be an algebraically closed field of characteristic 0 and Λ a finite-dimensional k-algebra. In ...
A Frobenius algebra is a finite-dimensional algebra $A$ which comes equipped with a coassociative, c...
AbstractJ. Kado and K. Oshiro (J. Algebra211 (1999), 384–408) proved the equivalence of (A) the exis...
AbstractLet B̂ be the repetitive algebra of a finite dimensional algebra B over a field K by the B-b...
AbstractWe analyze the homothety types of associative bilinear forms that can occur on a Hopf algebr...
AbstractA Frobenius algebra over a field k is called symmetric if the Nakayama automorphism is an in...
AbstractA Frobenius algebra over a field k is called symmetric if the Nakayama automorphism is an in...
International audienceIn analogy with a recent result of N. Kowalzig and U. Krahmer for twisted Cala...
Connections between annihilators and ideals in Frobenius and symmetric algebras are used to provide ...
Connections between annihilators and ideals in Frobenius and symmetric algebras are used to provide ...
Connections between annihilators and ideals in Frobenius and symmetric algebras are used to provide ...
Connections between annihilators and ideals in Frobenius and symmetric algebras are used to provide ...
Abstract. Connections between annihilators and ideals in Frobenius and symmet-ric algebras are used ...
left Λ-modules and the set of isoclasses of simple Λ modules will be denoted by modΛ and S(Λ), respe...
We give a simple proof, using Auslander-Reiten theory, that the preprojective algebra of a basic her...
Let k be an algebraically closed field of characteristic 0 and Λ a finite-dimensional k-algebra. In ...
A Frobenius algebra is a finite-dimensional algebra $A$ which comes equipped with a coassociative, c...
AbstractJ. Kado and K. Oshiro (J. Algebra211 (1999), 384–408) proved the equivalence of (A) the exis...
AbstractLet B̂ be the repetitive algebra of a finite dimensional algebra B over a field K by the B-b...
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