Robert Pollack and Glenn Stevens, Critical slope p-adic l-functions, (preprint), 2009.R. Pollack and G. Stevens, Critical slope p-adic L-functions, preprint 2009.Robert Pollack and Glenn Stevens, Critical slope p-adic L-functions, preprint, 2009....
Applying a big regulator map gives rise to a purely algebraic construction of a two-variable $p$-adic $L$-function over the eigencurve. As a first application of these ideas, we prove the equality of the $p$-adic $L$-functions associated with a critical-slope refinement of a modular ...
The emergence of large-scale connectivity on an underlying network or lattice, the so-called percolation transition, has a profound impact on the system’s macroscopic behaviours. There is thus great interest in controlling the location of the percolatio
state and prove an analogue of Sullivan's No Wandering Domains Theorem for p -adic rational functions which have no wild recurrent Julia critical points... RL Benedetto - 《Compositio Mathematica》 被引量: 106发表: 2000年 Critical Points of Tumor Necrosis Factor Action in Central Nervous System...
We study the adjunction property of the Jacquet–Emerton functor in certain neighborhoods of critical points in the eigencurve.As an application,we construct two-variable p-adic L-functions around critical points via Emerton's representation theoretic approach.Yi Wen DING数学学报(英文版)...
A. Lei, D. Loeffler, and S. L. Zerbes. Critical slope p-adic L-functions of CM modular forms. Israel J. Math., 198(1):261-282, 2013.PS13 R. Pollack and G. Stevens, Critical slope p-adic L-functions J. Lond. Math. Soc. (2) 87 (2013), no. 2, 428-452.Pollack, R., ...
p-adicL-functioneigencurvecriticalp-stabilizationJacquet-Emerton functorWe study the adjunction property of the Jacquet-Emerton functor in certain neighborhoods of critical points in the eigencurve. As an application, we construct two-variable p-adic L-functions around critical points via Emerton's ...
Wach modules and critical slope p-adic L-functions - Loeffler, Zerbes () Citation Context ...could define a p-adic L-function, at least up to scaling. However, we have been unable to establish this claim even in a particular case. 3 1 Since the writing of this paper, Loeffler and ...
p-adic L-functions for non-critical adjoint L-valuesdoi:10.7916/D8-RVN9-R814Pak Hin Lee
We relate non-critical special values of p-adic L-functions associated to algebraic Hecke characters of an imaginary quadratic number field with class number one to p-adic Eisenstein–Kronecker series constructed as the Coleman function, when the conductors of the algebraic Hecke characters are ...