Automorphy and irreducibility of some l-adic representations

In this paper we prove that a pure, regular, totally odd, polarizable weakly compatible system of l-adic representations is potentially automorphic. The innovation is that we make no irreducibility assumption, but we make a purity assumption instead. For compatible systems coming from geometry, purity is often easier to check than irreducibility. We use Katz's theory of rigid local systems to construct many examples of motives to which our theorem applies. We also show that if F is a CM or totally real field and if 71 is a polarizable, regular algebraic, cuspidal automorphic representation of GL(n)(AF), then for a positive Dirichlet density set of rational primes l, the l-adic representations r(l,i)(pi) associated to pi are irreducible.