Periodicity for subquotients of the modular category O

Abstract

In this paper we study the category O over the hyperalgebra of a reductive algebraic group in positive characteristics. For any locally closed subset K of weights we define a subquotient O[K] of O. It has the property that its simple objects are parametrized by elements in K. We then show that O[K] is equivalent to O[K+plγ] for any dominant weight γ if l>0 is an integer such that K (K+plη)= for all dominant weights η. This allows one, for example, to restrict attention to subquotients inside the dominant (or the antidominant) chamber.