Tamagawa number conjecture for CM modular forms and Rankin--Selberg convolutions (2407.11891v2)

Abstract: Let $E/F$ be an elliptic curve defined over a number field $F$ with complex multiplication by the ring of integers of an imaginary quadratic field $K$ such that the torsion points of $E$ generate over $F$ an abelian extension of $K$. In this paper we prove the $p$-part of the Birch and Swinnerton-Dyer formula for $E/F$ in analytic rank $1$ for primes $p>3$ split in $K$. This was previously known for $F=\mathbb{Q}$ by work of Rubin as a consequence of his proof of the Mazur--Swinnerton-Dyer ``main conjecture'' for rational CM elliptic curves, but the problem remained wide open for general $F$. The approach in this paper, based on a novel application of an idea of Bertolini--Darmon--Prasanna to consider a carefully chosen decomposable Rankin--Selberg convolution of two CM modular forms having the Hecke $L$-function of interest as one of the factors, circumvents the use of $p$-adic heights and Bertrand's $p$-adic transcendence results in previous approaches. It also yields a proof of similar results for CM abelian varieties $A/K$, and for CM modular forms of higher weight.