Tag Archives: Berger

Local gamma factors and p-adic L-functions

(Usual pedantry: Fix a prime , , , etc. For any finite over let denote the maximal unramified subfield, and write , , as usual. Set for any , with its natural actions of and .) Let be a number … Continue reading

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A simple construction of Sen’s functor

Let be a prime, and let . A –semilinear representation of  is a finite-dimensional -vector space with a continuous action of such that for all , and . One of the early successes of p-adic Hodge theory was Sen’s classification of … Continue reading

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