Nakayama automorphism and rigidity of dual reflection group coactions

Abstract: We study homological properties and rigidity of group coactions on Artin-Schelter regular algebras. g∈G p g ,

“…In [KKZ5], rigidity with respect to group coactions is studied. Let A be a connected (N-)graded k-algebra.…”

“…is equivalent to a G-grading of A (compatible with the original N-grading), and the fixed subring A coG is A e , the component of the unit element e ∈ A under the G-grading. We recall a definition [KKZ5,Definition 0.8]: we say that a connected graded algebra A is rigid with respect to group coactions if for every nontrivial finite group G coacting on A homogeneously and inner faithfully, the fixed subring A co G is not isomorphic to A as algebras. The following Artin-Schelter regular algebras are rigid with respect to group coactions [KKZ5, Theorem 0.9]:…”

“…Conjecture 0.2. The graded noetherian down-up algebras are rigid with respect to semisimple Hopf algebra actions in the sense of [KKZ5,Remark 0.10].…”

“…In a slightly different language, Theorem 0.1 says that graded noetherian downup algebras do not admit "dual reflection groups" for group coactions in the sense of [KKZ5,Definition 0.1]. A result in [KKZ3,Corollary 4.11] states: Let B be a noetherian Artin-Schelter regular domain, and let G be a finite group acting on B homogeneously.…”

“…Some basic definitions can be found in [BB,KKZ5]; for example, inner faithful is defined in [BB,Definition 2.7]. Artin-Schelter regular will be abbreviated by AS regular; for the definition see [KKZ5, Definition 1.1].…”

Rigidity of down-up algebras with respect to finite group coactions

“…In [KKZ5], rigidity with respect to group coactions is studied. Let A be a connected (N-)graded k-algebra.…”

“…is equivalent to a G-grading of A (compatible with the original N-grading), and the fixed subring A coG is A e , the component of the unit element e ∈ A under the G-grading. We recall a definition [KKZ5,Definition 0.8]: we say that a connected graded algebra A is rigid with respect to group coactions if for every nontrivial finite group G coacting on A homogeneously and inner faithfully, the fixed subring A co G is not isomorphic to A as algebras. The following Artin-Schelter regular algebras are rigid with respect to group coactions [KKZ5, Theorem 0.9]:…”

“…Conjecture 0.2. The graded noetherian down-up algebras are rigid with respect to semisimple Hopf algebra actions in the sense of [KKZ5,Remark 0.10].…”

“…In a slightly different language, Theorem 0.1 says that graded noetherian downup algebras do not admit "dual reflection groups" for group coactions in the sense of [KKZ5,Definition 0.1]. A result in [KKZ3,Corollary 4.11] states: Let B be a noetherian Artin-Schelter regular domain, and let G be a finite group acting on B homogeneously.…”

“…Some basic definitions can be found in [BB,KKZ5]; for example, inner faithful is defined in [BB,Definition 2.7]. Artin-Schelter regular will be abbreviated by AS regular; for the definition see [KKZ5, Definition 1.1].…”

Rigidity of down-up algebras with respect to finite group coactions

Semisimple Reflection Hopf Algebras of Dimension Sixteen

Examples of Non-Semisimple Hopf Algebra Actions on Artin-Schelter Regular Algebras