Construction of Anti-Cyclotomic Euler Systems of Abelian Varieties Associated to X1(N)

Abstract

Let K be an imaginary quadratic field, N be a positive integer, f(z) be a newform of level 1(N), and Af be the abelian variety associated to f. For each τ ∈ K (Im τ >0), we construct a certain point Pτ on Af defined over an extended ring class field of K of level N. Our construction generalizes Birch's construction of the Heegner points to the abelian varieties associated to modular forms of level 1(N) and nontrivial character. Then, we show that Pτ's satisfy the distribution and congruence relations of an Euler system, which implies that it should be possible to apply the Euler system techniques to them to show a relation between the non-torsionness of Pτ and the rank of Af(K).