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Perfectoid Spaces

This book contains selected chapters on perfectoid spaces, their introduction and applications, as invented by Peter Scholze in his Fields Medal winning work. These contributions are presented at the conference on “Perfectoid Spaces” held at the International Centre for Theoretical Sciences, Bengalu...

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Bibliographic Details
Other Authors: Banerjee, Debargha (Editor), Kedlaya, Kiran S. (Editor), de Shalit, Ehud (Editor), Chaudhuri, Chitrabhanu (Editor)
Format: eBook
Language:English
Published: Singapore Springer Nature Singapore 2022, 2022
Edition:1st ed. 2022
Series:Infosys Science Foundation Series in Mathematical Sciences
Subjects:
Number Theory
Algebraic Geometry
Online Access:
Collection: Springer eBooks 2005- - Collection details see MPG.ReNa
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505 0 |a On ψ-Lattices in Modular (φ, Γ)-Modules -- The Relative (De-)Perfectoidification Functor and Motivic P-Adic Cohomologies -- Diagrams and Mod p Representations of p-Adic Groups -- A Short Review on Local Shtukas and Divisible Local Anderson Modules -- An Introduction to p-Adic Hodge Theory -- Perfectoid Spaces: An Annotated Bibliography -- The Fargues–Fontaine Curve and p-Adichodgetheory -- Simplicial Galois Deformation Functors 
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653 |a Algebraic Geometry 
653 |a Number Theory 
653 |a Algebraic geometry 
700 1 |a Kedlaya, Kiran S.  |e [editor] 
700 1 |a de Shalit, Ehud  |e [editor] 
700 1 |a Chaudhuri, Chitrabhanu  |e [editor] 
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520 |a This book contains selected chapters on perfectoid spaces, their introduction and applications, as invented by Peter Scholze in his Fields Medal winning work. These contributions are presented at the conference on “Perfectoid Spaces” held at the International Centre for Theoretical Sciences, Bengaluru, India, from 9–20 September 2019. The objective of the book is to give an advanced introduction to Scholze’s theory and understand the relation between perfectoid spaces and some aspects of arithmetic of modular (or, more generally, automorphic) forms such as representations mod p, lifting of modular forms, completed cohomology, local Langlands program, and special values of L-functions. All chapters are contributed by experts in the area of arithmetic geometry that will facilitate future research in the direction 

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