Arithmetic of critical p-adic L-functions

Abstract

Our objective in the present work is to develop a fairly complete arithmetic theory of critical p-adic L-functions on the eigencurve. To this end, we carry out the following tasks: a) We give an "\'etale" construction of Bella\"iche's p-adic L-functions at a θ-critical point on the cuspidal eigencurve. b) We introduce the algebraic counterparts of these objects (which arise as appropriately defined Selmer complexes) and develop Iwasawa theory in this context, including a definition of an Iwasawa theoretic L-invariant L cr Iw. c) We formulate the (punctual) critical main conjecture and study its relationship with its slope-zero counterparts. Along the way, we also develop descent theory (paralleling Perrin-Riou's work). d) We introduce what we call thick (Iwasawa theoretic) fundamental line and the thick Selmer complex to counter Bella\"iche's secondary p-adic L-functions. This allows us to formulate an infinitesimal thickening of the Iwasawa main conjecture, and we observe that it implies both slope-zero and punctual critical main conjectures, but it seems stronger than both. e) We establish an OX-adic leading term formula for the two-variable p-adic L-function over the affinoid neighbourhood X= Spm(OX) in the eigencurve about a θ-critical point. Using this formula we prove, when the Hecke L-function of f vanishes to order one at the central critical point, that the derivative of the secondary p-adic L-function can be computed in terms of the second order derivative of an OX-adic regulator (rather than a regulator itself).