Pentactions and action representability in the category of reduced groups with action
Abstract
A notion of pentaction of any object in the category rGr of reduced groups with action is introduced. The operations are defined in the set Pentact(A) of pentactions of an object A of rGr. It is proved that if an object A is perfect with zero weak stabilizer in the sense defined in the paper, then Pentact(A) is an object of rGr, it has a derived action on A, the object A is action representable and Pentact(A) represents all actions on A.
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