La curva de Fargues--Fontaine: Una motivaci\'on al estudio de la teor\'ia de representaciones de Galois p-\'adicas

Abstract

This article, written in Spanish, provides a comprehensive review of the Fargues-Fontaine curve, a cornerstone in p-adic Hodge theory, and its pivotal role in classifying p-adic Galois representations. We synthesize key developments surrounding this curve, emphasizing its connection between advanced concepts in arithmetic geometry and the practical theory of representations. We offer a detailed analysis of the Fontaine period rings (Bcris, Bst, BdR), exploring their crucial algebraic and arithmetic properties and their contribution to the curve's construction and definition. Furthermore, we delve into the theory of admissible p-adic Galois representations, discussing how the curve, once defined, integrates with Harder-Narasimhan theory.

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