Lecture
Integration Theory: Berkovich Spaces
In course
DEMO: reprehenderit id
Ipsum esse exercitation mollit quis laborum eu nulla duis pariatur nostrud culpa labore labore. Qui do commodo nostrud ea qui minim quis deserunt officia duis amet incididunt. Fugiat laboris tempor ad non deserunt dolore tempor voluptate pariatur magna cupidatat. Eiusmod pariatur tempor commodo anim nostrud proident eu eu anim. Enim in duis nisi et Lorem aliqua esse anim non sint culpa elit nisi. Quis commodo minim nostrud consectetur nostrud ex. Nulla aliqua do excepteur ea eiusmod duis nisi eu dolor velit occaecat quis officia.
Description
This lecture delves into the integration theory over real numbers, highlighting the asymmetry in the heart measure and its implications. The instructor explains the limitations of generalizing the theory to Berkovich spaces, leading to unsolved conjectures. The session concludes with an example showcasing smooth varieties over K, emphasizing the intricacies of analytic manifolds and the Serre invariant.
Official source
About this result
This page is automatically generated and may contain information that is not correct, complete, up-to-date, or relevant to your search query. The same applies to every other page on this website. Please make sure to verify the information with EPFL's official sources.