A strong multiplicity one theorem for dimension data

Abstract

We call the dimension data DH1 and DH2 of two closed subgroups H1 and H2 of a given compact Lie group G almost equal if DH1()=DH2() for all but finitely many irreducible complex linear representations of G up to equivalence. When G is connected, we show that: if DH1 and DH2 are almost equal, then they are equal. When G is non-connected, G0⊂ H1 H2 is a trivial sufficient condition for DH1 and DH2 to be almost equal. In this case assume that DH1 and DH2 are almost equal but non-equal. We show strong relations between H1 and H2 and we construct an example which indicates that G0⊂ H1 H2 is not a necessary condition.