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Please use this identifier to cite or link to this item: http://arks.princeton.edu/ark:/88435/dsp010c483n01s
Title: A Scholzian Approach to the Local Langlands Correspondence for \(\mathrm{GL}_n\) over function fields
Authors: Li, Daniel
Advisors: Morel, Sophie M.
Contributors: Taylor, Richard L.
Department: Mathematics
Class Year: 2017
Abstract: Let \(F\) is a local field of characteristic \(p\). Inspired by work of Scholze, we construct a map \(\pi\mapsto\sigma(\pi)\) from irreducible smooth representations of \(\mathrm{GL}_n(F)\) to \(n\)-dimensional Weil representations of \(F\). We prove that this map uniquely satisfies a purely local compatibility condition on traces of a test function \(f_{\tau,h}\), and we also prove that this map is compatible with parabolically inducing tensor products. It is expected that \(\pi\mapsto\sigma(\pi)\) equals the local Langlands correspondence for \(\mathrm{GL}_n\) over \(F\), up to Frobenius semisimplification.
URI: http://arks.princeton.edu/ark:/88435/dsp010c483n01s
Type of Material: Princeton University Senior Theses
Language: en_US
Appears in Collections:Mathematics, 1934-2023

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