The Grothendieck Period Conjecture and Mixed Motives with Maximal Unipotent Radicals - Part 2

Delve into the second part of a Fields Institute lecture exploring the Grothendieck period conjecture and mixed motives with maximal unipotent radicals. Presented by Payman Eskandari from the University of Winnipeg, this 57-minute talk is part of the 2023-2024 Fields Number Theory Seminar series. Gain advanced insights into this complex mathematical topic, building upon the foundations laid in the first part of the lecture. Examine the intricate relationships between periods, motives, and unipotent radicals as Eskandari continues to unravel the implications of Grothendieck's conjecture in the realm of algebraic geometry and number theory.

The Grothendieck period conjecture and mixed motives with maximal unipotent radicals – Part 2