Graded identities for algebras with elementary gradings over an infinite field

Abstract: Let $F$ be an infinite field of positive characteristic $p > 2$ and let $G$ be a group. In this paper, we study the graded identities satisfied by an associative algebra equipped with an elementary $G$ -grading. Let $E$ be the infinite-dimensional Grassmann algebra. For every $a$ , $b\in \mathbb {N}$ , we provide a ba… Show more

“…Advancements in the classification of group gradings on non-simple algebras have also been made, as seen in the articles [2,4,7]. In particular, the complete classification of isomorphism classes of group gradings on the algebra of upper triangular matrices is given in the works [3,11].…”

Group gradings on finite dimensional incidence algebras

“…Advancements in the classification of group gradings on non-simple algebras have also been made, as seen in the articles [2,4,7]. In particular, the complete classification of isomorphism classes of group gradings on the algebra of upper triangular matrices is given in the works [3,11].…”

Group gradings on finite dimensional incidence algebras

Graded identities of M(E) and their generalizations over infinite fields