Projection of root systems and the generalized injectivity conjecture for exceptional groups

Abstract

Let a be a real euclidean vector space of finite dimension and a root system in a with a basis . Let ⊂ and M = M be a standard Levi of a reductive group G such that a = aM / aG. Let us denote d the dimension of a, i.e the cardinal of - and the set of all non-trivial projections of roots in . We obtain conditions on such that contains a root system of rank d. When considering the case of of type exceptional, we give a list of all exceptional root systems that can occur in and use it to prove the generalized injectivity conjecture in most exceptional groups cases.

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