The category of etale (phi, tau)-modules, similar as the category of etale (phi, Gamma)-modules, is equivalent to the category of p-adic Galois representations. A classical theorem of Cherbonnier-Colmez says that all etale (phi, Gamma)-modules are overconvergent. In this talk, we show that all etale (phi, tau)-modules are also overconvergent. Our method is completely different from that of Cherbonnier-Colmez. The key idea is a certain crystalline approximation technique. This is joint work with Tong Liu.

Lecture 1.

I will recall the classical theorem of Cherbonnier-Colmez on overconvergence of etale (phi, Gamma)-modules.

Then I will recall Kisin modules and (phi, /hat G)-modules, which will be the key tool in integral p-adic Hodge theory in our setting.

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