The study of Euler systems and p-adic L-functions has experienced remarkable growth over the past decade, driving major advances in arithmetic geometry and Iwasawa theory. These developments have led to new cases of the equivariant Birch and Swinnerton-Dyer conjecture (BSD), the Bloch--Kato conjecture, and the Iwasawa Main Conjecture. Recent breakthroughs, powered by refined tools such as higher Hida theory, higher Coleman theory, and geometric approaches to p-adic variation, have opened the door to striking applications, including progress on the Gross--Stark conjectures and on the BSD conjecture for abelian surfaces. This workshop will bring together leading experts to explore these directions.
Raúl Alonso (University College Dublin)
Kazim Büyükboduk (University College Dublin)
Francesc Castella (University of California Santa Barbara)
Antonio Cauchi (University College Dublin)
Xenia Dimitrakopoulou (Aix-Marseille Université)
Michele Fornea (University of Padova)
Andrew Graham (University of Oxford)
Giada Grossi TBC (CNRS)
Armando Gutiérrez (Aarhus University)
Zheng Liu (University of California Santa Barbara)
David Loeffler (Fernuni Schweiz)
Alexandre Maksoud (University of Bonn)
Ariel Pacetti TBC (Universidade de Aveiro)
María Rosaria Pati (University of Genova)
Alice Pozzi (University of Bristol)
Martí Roset (IMJ-PRG, Sorbonne Université)
Víctor Rotger TBC (Universitat Politècnica de Catalunya)
Matteo Tamiozzo (Université Sorbonne Paris Nord)
Jan Vonk (Leiden University)
Ju-Feng Wu (University College Dublin)
Sarah Zerbes (ETH)
Laura López (CITMAga)
Lois Omil-Pazos (CITMAga - USC)
Javier Polo (CITMAga - USC)
Óscar Rivero (CITMAga - USC)
For any problems or queries regarding the conference, you can contact the organizers at:
Facultade de Matemáticas of the Universidade de Santiago de Compostela, Rúa de Lope Gómez de Marzoa s/n, 15705, Santiago de Compostela (A Coruña - Spain)