@PhdThesis{duepublico_mods_00081772,
  author = 	{Marannino, Luca},
  title = 	{Generalized triple product p-adic L-functions, diagonal classes and rational points on elliptic curves},
  year = 	{2024},
  month = 	{Apr},
  day = 	{02},
  keywords = 	{Triple product, diagonal classes, explicit reciprocity law},
  abstract = 	{In the first part of this thesis (chapters 1 to 5, we generalize and simplify the constructions of Darmon-Rotger and Hsieh of an unbalanced triple product p-adic L-function Lpf(F,G,H) attached to a triple (F,G,H) of p-adic families of modular forms, allowing more flexibility for the choice of G and H. Assuming that G and H are families of theta series of infinite p-slope, we prove a factorization of (an improvement of) Lpf(F,G,H) in terms of two anticyclotomic p-adic L-functions. As a corollary, when F specializes in weight 2 to the newform attached to an elliptic curve E over Q with multiplicative reduction at p, we relate Heegner points on E to p-adic partial derivatives of Lpf(F,G,H) evaluated at the critical triple of weights (2,1,1). In the second part, we generalize the p-adic explicit reciprocity laws for balanced diagonal classes by Darmon-Rotger and Bertolini-Seveso-Venerucci to the case of geometric balanced triples (f,g,h) of modular eigenforms where f is ordinary at p, while g and h are supercuspidal at p. This allows to obtain a geometric interpretation of the specializations of the p-adic L-function Lpf(F,G,H) in the so-called geometric balanced region, when G and H are families of theta series of infinite p-slope.},
  doi = 	{10.17185/duepublico/81772},
  url = 	{https://duepublico2.uni-due.de/receive/duepublico_mods_00081772},
  url = 	{https://doi.org/10.17185/duepublico/81772},
  file = 	{:https://duepublico2.uni-due.de/servlets/MCRFileNodeServlet/duepublico_derivate_00081233/Diss_Marannino.pdf:PDF},
  language = 	{en}
}