In this lecture, I will talk about basic ingredients for the proof of the Weil conjectures. I will cover the following topics.

• Statement of Weil conjectures.

• Weil cohomology theory.

• Sites, topoi, sheaf cohomology.

• Étale cohomology.

• l-adic étale cohomology.

With these, we get 3 out of 4 statements of the Weil conjecture. If time permits, I will cover

• Katz’s proof of the Riemann Hypothesis for hypersurfaces.

This, together with Scholl’s reduction from the general case to the hypersurfaces, we get the whole Weil conjectures. This proof does not require ‘Weil II’.