A new approach to the and Serre-Lusztig relations for groups
Abstract
We give a new, conceptual proof of the and Serre-Lusztig relations for groups. The key to our approach is a new formula for the comultiplication of the -divided powers, which allows us to reformulate the relations in terms of the adjoint action. We then obtain a proof using properties of the adjoint representation. The flexibility of this approach allows us to establish a more general family of relations which seem difficult to establish otherwise.
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