Venkatesh’s conjectures on arithmetic groups
Venkatesh has recently formulated a series of conjectures, in collaboration with Galatius, Harris and Prasanna, which aim to explain the presence of the same system of eigenvalues in several cohomological degrees of a bounded symmetric domain.
Mordell-Faltings a la Chabauty-Kim
STNB Talks
See http://stnb.cat/ca/seminaris/2019/ for details.
Venkatesh’s conjectures on arithmetic groups
Venkatesh has recently formulated a series of conjectures, in collaboration with Galatius, Harris and Prasanna, which aim to explain the presence of the same system of eigenvalues in several cohomological degrees of a bounded symmetric domain.
Mordell-Faltings a la Chabauty-Kim
STNB Talks
See http://stnb.cat/ca/seminaris/2019/ for details.
On the Bloch-Kato conjecture for automorphic polarized motives
The goal of these lectures is to present a proof towards some results predicted by the Bloch-Kato conjecture giving a link between the order of vanishing of the L-function of a motive and the rank of the corresponding Bloch-Kato-Selmer group.
On the Bloch-Kato conjecture for automorphic polarized motives
The goal of these lectures is to present a proof towards some results predicted by the Bloch-Kato conjecture giving a link between the order of vanishing of the L-function of a motive and the rank of the corresponding Bloch-Kato-Selmer group.
Working group on “Diophantine Problems and p-adic Period Mappings”
On the Bloch-Kato conjecture for automorphic polarized motives
The goal of these lectures is to present a proof towards some results predicted by the Bloch-Kato conjecture giving a link between the order of vanishing of the L-function of a motive and the rank of the corresponding Bloch-Kato-Selmer group.