A Note On Non-ordinary Primes
Abstract
Suppose that OL is the ring of integers of a number field L, and suppose that f(z)=Σn=1∞ af(n)qn∈ Sk OL[[q]] (note: q := e2π iz) is a normalized Hecke eigenform for SL2(Z). We say that f is non-ordinary at a prime p if there is a prime ideal p⊂ OL above p for which af(p) 0 \ (mod\ p). For any finite set of primes S, we prove that there are normalized Hecke eigenforms which are non-ordinary for each p∈ S. The proof is elementary and follows from a generalization of work of Choie, Kohnen and the third author.
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