Save Big on Coursera Plus. 7,000+ courses at $160 off. Limited Time Only! Grab it Explore the fascinating connections between two-loop Feynman diagrams and elliptic curves in this Rothschild Lecture by Professor Spencer Bloch from the University of Chicago. Delve into the algebraic geometry behind cubic hypersurfaces arising from two-loop graphs, focusing on cases with 3, 5, and 7 variables. Discover how these structures relate to elliptic curves and their potential implications for understanding two-loop amplitudes. Learn about the relationship between one-loop graph amplitudes and dilogarithms, and consider the possibility of connections between two-loop amplitudes and elliptic dilogarithms. Gain insights into this collaborative research involving C. Doran, P. Vanhove, and M. Kerr, presented at the Isaac Newton Institute for Mathematical Sciences as part of the "K-theory, algebraic cycles and motivic homotopy theory" programme.