Narrow Results

This paper generalizes work of Buzzard and Kilford to the case p = 3, giving an explicit bound for the overconvergence of the quotient E_κ/V(E_κ) and using this bound to prove that the eigencurve is a union of countably many annuli over the boundary of weight space.

Starting with a numerically noncritical (at $p$) Hecke eigenclass $f$ in the homology of a congruence subgroup $\mathrm{\Gamma }$ of ${\mathrm{\text{SL}}}_3(\mathbb{Z})$ (where $p$ divides the level of $\mathrm{\Gamma }$) with classical coefficients, we first show how to compute to any desired degree of accuracy a lift of $f$ to a Hecke eigenclass $F$ with coefficients in a module of $p$-adic distributions. Then we show how to find to any desired degree of accuracy the germ of the projection $Z$ to weight space of the eigencurve around the point $z$ corresponding to the system of Hecke eigenvalues of $F$. We do this under the conjecturally mild hypothesis that $Z$ is smooth at $z$.