The hypercenter of an algebraic group
Abstract
We show that any connected algebraic group G over a field admits a nilpotent normal subgroup Z∞(G) such that the quotient G/Z∞(G) has trivial center. We construct Z∞(G) as the final term of the transfinitely extended upper central series of G; accordingly, we call it the hypercenter of G. We establish several related results about the upper central series of G, along with an analogue for algebraic groups of a well-known theorem of Fitting's.
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