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5
votes
Accepted
Existence of congruences between modular forms / elliptic curves
Given an eigencuspform $f$ of weight $k≥2$ (so in particular 2) and $p$ a prime of ordinary reduction (in particular good ordinary reduction), there is always a Hida family passing through $f$. This …
8
votes
Accepted
Arithmetic points are dense on a Hida family
Hida theory is a vast domain of research. I am assuming that that you are in the simplest and oldest setting: Hida theory for ordinary eigencuspforms for the group $\operatorname{GL}_2$ over $\mathbb …
1
vote
Atkin--Lehner operators in Hida theory
Like yourself, I have found a reference for these results hard to find, even in the case of Hida families. These are a few pointers.
In the case of Hida families, once the Atkin-Lehner involutions ar …
3
votes
Example of a non-smooth irreducible component of the generic fibre of a Hida family?
This is an answer of rather low quality, but let me report that in several discussions about this topic with (many) experts over the span of many years, I have neither met anyone knowing of such an ex …
2
votes
Interpolation of periods for a Hida family of modular forms
(1) The answer is yes. In fact this was done by Ohta himself essentially simultaneously as the other cases. The relevant publication is here (the proof in the case $k\equiv 2$ is around 569/570).
(2) …
3
votes
Periods for 2-variable p-adic L-functions
Assuming you are writing about Mok's Compositio 2009 article, the answer is easy: it's a question of quantifier ordering. There are two statements which you could call the interpolation property for a …
7
votes
3
answers
2k
views
Free subquotient of Galois representations coming from Hida theory
Let $\mathbf{T}$ be the reduced nearly ordinary Hecke algebra of level $N$ of Hida theory for $\operatorname{GL}_{2}$ over $\mathbb{Q}$ (or more generally over a totally real field $F$). Then $\mathbf …