On the non-critical exceptional zeros of Katz p-adic L-functions for CM fields

“…As a first consequence of this result, one may extend the validity of the leading term formula for Katz's p-adic L-function that is proved by Büyükboduk and Sakamoto in [19,Thm. 1.6] to cases when p divides the class number of the imaginary quadratic base field k (cf.…”

“…These congruences offer a conceptual approach to conjectures concerning trivial zeroes of p-adic L-functions. For example, they recover the Gross-Stark conjecture resolved by Dasgupta, Kakde, and Ventullo in [25] and also have consequences for the leading term of Katz's p-adic L-function (see [19]).…”

“…eTNC for imaginary quadratic fields 381 (c) A containment as in the statement of Conjecture 3.4 should be thought of as an order of vanishing statement. In fact, it can be directly linked to the order of vanishing of a p-adic L-function in many cases (see, for example, [19,Lem. 4.9]).…”

The equivariant Tamagawa number conjecture for abelian extensions of imaginary quadratic fields

“…As a first consequence of this result, one may extend the validity of the leading term formula for Katz's p-adic L-function that is proved by Büyükboduk and Sakamoto in [19,Thm. 1.6] to cases when p divides the class number of the imaginary quadratic base field k (cf.…”

“…These congruences offer a conceptual approach to conjectures concerning trivial zeroes of p-adic L-functions. For example, they recover the Gross-Stark conjecture resolved by Dasgupta, Kakde, and Ventullo in [25] and also have consequences for the leading term of Katz's p-adic L-function (see [19]).…”

“…eTNC for imaginary quadratic fields 381 (c) A containment as in the statement of Conjecture 3.4 should be thought of as an order of vanishing statement. In fact, it can be directly linked to the order of vanishing of a p-adic L-function in many cases (see, for example, [19,Lem. 4.9]).…”

The equivariant Tamagawa number conjecture for abelian extensions of imaginary quadratic fields

“…cit. and is closer in spirit to the study of e. g. [Cas18a] and [RR20a], sharing some points in common with earlier work of Solomon [Sol92] and Bley [Ble04], and also with the recent preprint of Büyükboduk and Sakamoto [BS19]. Fix once and for all a prime p and a quadratic imaginary field K in which p splits, and fix embeddings C ← Q → C p .…”

Arithmetic applications of the Euler systems of Beilinson-Flach elements and diagonal cycles

“…Moreover, by using the assumption that H 0 (G kp , T /mT ) = 0, one can show that the complex RΓ (G kp , T K ) has perfect amplitude in [1, 1] (see, for example, [BS22,Corollary A.5]). Since the Euler-Poincaré characteristic of RΓ (G kp , T K ) is r (see [NSW08,Corollary 7.3.8]), it follows that the Λ Kmodule H 1 (G kp , T K ) is free of rank r. The isomorphism (5.5) shows that, for any ideal I of Λ K , we have…”

Notes on the module of Euler systems for $p$-adic representations