The local Langlands correspondence for GLn over function fields
Abstract
Let F be a local field of characteristic p>0. By adapting methods of Scholze, we give a new proof of the local Langlands correspondence for n over F. More specifically, we construct -adic Galois representations associated with many discrete automorphic representations over global function fields, which we use to construct a map recπ(π) from isomorphism classes of irreducible smooth representations of n(F) to isomorphism classes of n-dimensional semisimple continuous representations of WF. Our map is characterized in terms of a local compatibility condition on traces of a certain test function fτ,h, and we prove that equals the usual local Langlands correspondence (after forgetting the monodromy operator).
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