Partial actions: what they are and why we care

Abstract: We present a survey of recent developments in the theory of partial actions of groups and Hopf algebras.

“…In this section, we recall a few results from [9] about partial representations of Hopf algebras. For more details and the relation with the group case, we refer to [9] or the review [10] and the references therein.…”

“…The theory of partial actions soon became important in the theory of dynamical systems [19] and, after the seminal paper [14], attracted the attention of pure algebraists as well. For an overview of the historical development of the theory of partial actions, see, for example, [10] and [13].…”

Dilations of partial representations of Hopf algebras

“…In this section, we recall a few results from [9] about partial representations of Hopf algebras. For more details and the relation with the group case, we refer to [9] or the review [10] and the references therein.…”

“…The theory of partial actions soon became important in the theory of dynamical systems [19] and, after the seminal paper [14], attracted the attention of pure algebraists as well. For an overview of the historical development of the theory of partial actions, see, for example, [10] and [13].…”

Dilations of partial representations of Hopf algebras

“…Take a#h ∈ A# ω H, then (1) )ω −1 (S(h (2) ), h (4) )#S(h (1) ))(a (2) #h (5) ) = (S(h (5) ) · S A (a (1) ))ω −1 (S(h (4) ), h (6) )(S(h (3) ) · a (2) )ω(S(h (2) ), h (7) )#S(h (1) )h (8) = (S(h (4) ) · S A (a (1) ))(S(h (3) ) · a (2) )ω −1 (S(h (2) ), h (5) )ω(S(h (1) ), h (6) )#S(h (7) )h (8) = (S(h (3) ) · S A (a (1) ))(S(h (2) ) · a (2) )(S(h (1) ) · (h (4) · 1 A ))#1 H = (S(h (3) ) · S A (a (1) ))(S(h (2) ) · a (2) )(S(h (1) )h (4) · 1 A )#1 H = (S(h (2) ) · S A (a (1) ))(S(h (1) ) · a (2) )#1 H = (S(h) · (S A (a (1) )a (2) ))#1 H = s r (S(h) · ǫ A (a)) = s • ǫ r (a#h).…”

“…and µ(Id ⊗ E(A),◮◭ S) • ∆ r (a#h) = (a (1) #h (1) )S(a (2) #h (2) ) =(a (1) #h (1) )(S(h (4) ) · S A (a (2) )ω −1 (S(h (3) ), h (5) )#S(h (2) )) =(a (1) (h (1) · (S(h (7) ) · S A (a (2) )ω −1 (S(h (6) ), h (8) )))ω(h (2) , S(h (5) ))#h (3) S(h (4) ) =(a (1) (h (1) · (S(h (6) ) · S A (a (2) )))(h (2) · ω −1 (S(h (5) ), h (7) ))ω(h (3) , S(h (4) ))#1 H =(a (1) (h (1) · (S(h (2) ) · S A (a (2) )))(h (3) · ω −1 (S(h (6) ), h (7) ))ω(h (4) , S(h (5) ))#1 H =(a (1) (h (1) S(h (2) ) · S A (a (2) )))(h (3) · ω −1 (S(h (6) ), h (7) ))ω(h (4) , S(h (5) ))#1 H =a (1) S A (a (2) )(h (1) · ω −1 (S(h (4) ), h (5) ))ω(h (2) , S(h (3) ))#1 H ( * ) =ǫ A (a)ω −1 (h (1) S(h (8) ), h (9) )ω(h (2) , S(h (7) )h (10) )ω −1 (h (3) , S(h (6) ))ω(h (4) , S(h (5) ))#1 H =ǫ A (a)ω −1 (h (1) S(h (6) ), h (7) )ω(h (2) , S(h (5) )h (8) )(h (3) · (S(h (4) ) · 1 A ))#1 H =ǫ A (a)ω −1 (h (1) S(h (5) ), h (6) )ω(h (2) , S(h (4) )h (7) )(h (3) · 1 A )#1 H =ǫ A (a)ω −1 (h (1) S(h …”

“…This work allowed the generalization of classical results in Hopf algebra theory as well several ideas developed for partial group actions, as globalization theorem [2], Morita equivalence between the partial smash product and the invariant subalgebra [3], duality for partial actions [4], partial representations [7], etc. For a more detailed account on recent developments of partial actions of groups and Hopf algebras, see [8] and references therein. Of particular interest for the present article are the notions of twisted partial actions of Hopf algebras, partial crossed products and partially cleft extensions of algebras by Hopf algebras [5].…”

Cohomology for partial actions of Hopf algebras

Étale Groupoids and Steinberg Algebras a Concise Introduction