The Boecherer conjecture is a generalization of the Waldspurger formula and relates squares of Bessel periods of genus two Siegel cusp forms to the central L-values.
This conjecture was currently proved by Furusawa and Morimoto for the special Bessel period, and the general case is a work-in-progress.
In this talk I will construct a square root of an anticyclotomic p-adic L-function with explicit interpolation formulas for Siegel cusp forms of genus 2 and scalar weight greater than 1 with respect to paramodular groups of square-free level, assuming the Boecherer conjecture for the L-values with anticyclotomic twist.
This is a joint work with Ming-Lun Hsieh.
Sunsuke Yamana
Anticyclotomic p-adic spinor L-functions for PGSp(4)
Jeudi, 7 Juin, 2018 - 10:30
Résumé :
Thème de recherche :
Théorie des nombres
Salle :
Salle 4