Signed p-adic L-functions of Bianchi modular forms

Abstract

Let p≥ 3 be a prime number and K be a quadratic imaginary field in which p splits as pp. Let F be a cuspidal Bianchi eigenform over K of weight (k,k), where k≥ 0 is an integer, level m coprime to p, and non-ordinary at both of the primes above p. We assume F has trivial nebentypus. For q∈\p, p\, let aq be the Tq Hecke eigenvalue of F and let αq,βq be the roots of polynomial X2 -aqX+ pk+1. Then we have four p-stabilizations of F: Fαp,αp, Fαp,βp, Fβp,αp, and Fβp,βp which are Bianchi cuspforms of level pm. By the works of Williams, to each p-stabilization F*,, we can attach a locally analytic distribution Lp(F*,) over the ray class group Cl(K,p∞). On viewing Lp(F*,) as a two-variable power series with coefficients in some p-adic field having unbounded denominators satisfying certain growth conditions, we decompose this power series into a linear combination of power series with bounded coefficients in the spirit of Pollack, Sprung, and Lei--Loeffler--Zerbes.