On the center of a compact group
Abstract
We prove a conjecture due to Baumgaertel and Lledo according to which for every compact group G one has Z(G) C(G), where the `chain group' C(G) is the free abelian group (written multiplicatively) generated by the set G of isomorphism classes of irreducible representations of G modulo the relations [Z]=[X]·[Y] whenever Z is contained in X Y. Thus the center Z(G) depends only on the representation ring of G. Furthermore, we prove that every `t-map' phi: G -> A into an abelian group, i.e. every map satisfying phi(Z)=phi(X)phi(Y) whenever X,Y,Z in G and Z X Y, factors through the restriction map G -> Z(G). All these results also hold for proalgebraic groups over algebraically closed fields of characteristic zero.
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