Divisors on Fargues-Fontaine Curves
Appears in collection : New Structures and Techniques in $p$-adic Geometry
We will explain how vector bundles on different moduli spaces of degree 1 divisors on Fargues-Fontaine curves geometrize $(\varphi,N,{\rm Gal}_{Q_p})$-modules and $(\varphi,\Gamma)$-modules, all or with the restriction of being de Rham, and how this leads to a definition of (perfect) analytic prismatization over $Q_p$.
