On the Dynkin index of a principal sl2-subalgebra
Abstract
Let g be a simple Lie algebra over an algebraically closed field of characteristic zero. The goal of this note is to prove a closed formula for the Dynkin index of a principal sl2-subalgebra of g. The key step in the proof uses the "strange formula" of Freudenthal--de Vries. As an application, we (1) compute the Dynkin index any simple g-module regarded as sl2-module and (2) obtain an identity connecting the exponents of g and the dual Coxeter numbers of both g and the Langlands dual g.
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