Geometry of the eigencurve at CM points and trivial zeros of Katz p-adic L-functions

Abstract

The primary goal of this paper is to investigate the geometry of the p-adic eigencurve at a point f corresponding to a weight one cuspidal theta series irregular at the prime number p. We show that f belongs to exactly three or four irreducible components and study their intersection multiplicities. In particular, we show that the congruence ideal of a CM component has a simple zero at f if and only if a certain anti-cyclotomic L-invariant L-() does not vanish. Further, using Roy's Strong Six Exponential Theorem we show that at least one amongst L-() and L-(-1) is non-zero. Combined with a divisibility proved by Hida and Tilouine, we deduce that the anti-cyclotomic Katz p-adic L-function of has a simple (trivial) zero at s=0 if L-() is non-zero, which can be seen as an anti-cyclotomic analogue of a result of Ferrero and Greenberg. Finally, we propose a formula for the linear term of the two-variable Katz p-adic L-function of at s=0 extending a conjecture of Gross.