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Explore the mathematical concepts of Euler systems and their relationship to congruences in this advanced lecture delivered at the International Centre for Theoretical Sciences. Delve into sophisticated number theory topics as part of a comprehensive program on automorphic forms and the Bloch-Kato conjecture. Examine how Euler systems serve as powerful tools for understanding arithmetic properties of L-functions and their special values. Learn about the intricate connections between these mathematical structures and congruence relations that arise in algebraic number theory. Discover how these concepts contribute to major conjectures in modern number theory, including the Birch and Swinnerton-Dyer conjecture and its generalizations. Gain insights into cutting-edge research methodologies used to study the arithmetic nature of special values of complex L-functions associated with algebraic varieties, motives, and automorphic representations over global fields. Understand the role of automorphic forms in advancing our knowledge of L-values and their connections to algebraic structures such as Chow groups and Selmer groups.
Syllabus
Euler Systems and Congruences by Eric Urban
Taught by
International Centre for Theoretical Sciences