The Tamagawa number conjecture and Kolyvagin's conjecture for motives of modular forms

Abstract

Assuming specific instances of two general conjectures in arithmetic algebraic geometry (bijectivity of p-adic regulator maps, injectivity of p-adic Abel-Jacobi maps), we prove several cases of the p-part of the Tamagawa number conjecture (p-TNC) of Bloch-Kato and Fontaine-Perrin-Riou for (homological) motives of modular forms of even weight ≥4 in analytic rank 1. More precisely, we prove our results for a large class of newforms f and prime numbers p that are ordinary for f and such that the weight of f is congruent to 2 modulo 2(p-1). Inspired by work of W. Zhang in weight 2, the key ingredient in our strategy is an analogue for p-adic Galois representations attached to higher (even) weight newforms of Kolyvagin's conjecture on the p-indivisibility of derived Heegner points on elliptic curves, which we prove via a p-adic variation method exploiting the arithmetic of Hida families. Along the way, we also prove (under similar assumptions) the p-TNC for modular motives in analytic rank 0 and the rationality conjecture of Beilinson and Deligne on the existence of zeta elements on the fundamental line in analytic ranks 0 and 1. Prior to this work, the only known results on (questions related to) the p-TNC for modular motives were in weight 2 and analytic rank ≤1 and in even weight and analytic rank 0. As further applications of our result on Kolyvagin's conjecture in higher weight, we deduce a structure theorem for Selmer groups, p-parity results, converse theorems and higher rank results for modular forms and modular motives.

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