This article studies a distinguished collection of so-called generalized Heegner cycles in the product of a Kuga-Sato variety with a power of a CM elliptic curve. Its main result is a p-adic analogue of the Gross-Zagier formula which relates the images of generalized Heegner cycles under the p-adic Abel-Jacobi map to the special values of certain p-adic Rankin L-series at critical points that lie outside their range of classical interpolation
The goal of this thesis is to generalize to elliptic curves a classical formula of Hecke. This is ch...
In this thesis we study algebraic cycles on Shimura varieties of orthogonal type. Such varieties are...
Iwasawa theory of Heegner points on abelian varieties of GL2 type has been studied by, among others,...
Abstract. This article is the rst in a series devoted to studying generalised Gross-Kudla-Schoen dia...
International audienceWe prove a general formula for the $p$-adic heights of Heegner points on modul...
In this thesis we study the so-called ``big Heegner points'' introduced and first studied by Ben How...
This article presents a new proof of a theorem of Karl Rubin relating values of the Katz p-adic L-fu...
We study generalised Heegner cycles, originally introduced by Bertolini–Darmon–Prasanna for modular ...
We relate the derivative of a p-adic Rankin-Selberg L-function to p-adic heights of the generalized ...
We relate p-adic families of Jacobi forms to Big Heegner points constructed by B. Howard, in the spi...
International audienceWe relate p-adic families of Jacobi forms to Big Heegner points constructed by...
In 2013, Kobayashi proved an analogue of Perrin-Riou's \(p\)-adic Gross-Zagier formula for elliptic...
Let f be an even weight k>=2 modular form on a p-adically uniformizable Shimura curve for a suitable...
Darmon cycles are a higher weight analogue of Stark-Heegner points. They yield local cohomology clas...
We construct "generalized Heegner cycles" on a variety fibered over a Shimura curve, defined over a ...
The goal of this thesis is to generalize to elliptic curves a classical formula of Hecke. This is ch...
In this thesis we study algebraic cycles on Shimura varieties of orthogonal type. Such varieties are...
Iwasawa theory of Heegner points on abelian varieties of GL2 type has been studied by, among others,...
Abstract. This article is the rst in a series devoted to studying generalised Gross-Kudla-Schoen dia...
International audienceWe prove a general formula for the $p$-adic heights of Heegner points on modul...
In this thesis we study the so-called ``big Heegner points'' introduced and first studied by Ben How...
This article presents a new proof of a theorem of Karl Rubin relating values of the Katz p-adic L-fu...
We study generalised Heegner cycles, originally introduced by Bertolini–Darmon–Prasanna for modular ...
We relate the derivative of a p-adic Rankin-Selberg L-function to p-adic heights of the generalized ...
We relate p-adic families of Jacobi forms to Big Heegner points constructed by B. Howard, in the spi...
International audienceWe relate p-adic families of Jacobi forms to Big Heegner points constructed by...
In 2013, Kobayashi proved an analogue of Perrin-Riou's \(p\)-adic Gross-Zagier formula for elliptic...
Let f be an even weight k>=2 modular form on a p-adically uniformizable Shimura curve for a suitable...
Darmon cycles are a higher weight analogue of Stark-Heegner points. They yield local cohomology clas...
We construct "generalized Heegner cycles" on a variety fibered over a Shimura curve, defined over a ...
The goal of this thesis is to generalize to elliptic curves a classical formula of Hecke. This is ch...
In this thesis we study algebraic cycles on Shimura varieties of orthogonal type. Such varieties are...
Iwasawa theory of Heegner points on abelian varieties of GL2 type has been studied by, among others,...
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