An anticyclotomic Euler system of Hirzebruch--Zagier cycles I: Norm relations and p-adic interpolation

Abstract

We construct an anticyclotomic Euler system for the Asai Galois representation associated to p-ordinary Hilbert modular forms over real quadratic fields. We also show that our Euler system classes vary in p-adic Hida families. The construction is based on the study of certain Hirzebruch--Zagier cycles obtained from modular curves of varying level diagonally emdedded into the product with a Hilbert modular surface. By Kolyvagin's methods, in the form developed by Jetchev--Nekov\'ar--Skinner in the anticyclotomic setting, the construction yields new applications to the Bloch--Kato conjecture and the Iwasawa Main Conjecture.