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Let $f = \sum_n a_n q^n$ be a cuspidal newform of weight $k$ on $\Gamma_0(N)$ for some $N$. Let $K_f$ be the number field generated by the $a_q$ as $q$ runs over all primes.

My question: if we consider the field generated by all but one of these $a_q$, can this field be smaller than $K_f$?

(edited based on Sawin's answer to only look at Fourier coefficients at primes)

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2 Answers 2

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No, strong multiplicity one says that all-but-finitely-many of the $a_p$'s determine all the others.

Edit in response to comment/query, and further in response to subsequent comments: ... and, once all the other coefficients are determined by strong multiplicity one (for newforms), invoke Shimura's results (arguably going back to Fricke-Klein in principle) that automorphisms of the complex numbers over $\mathbb Q$ (not merely Galois automorphisms on an algebraic closure of $\mathbb Q$) can be applied to the Fourier coefficients of a holomorphic modular form, producing another. In the case at hand, applying such an automorphism over the field generated by all the given Fourier coefficients, and subtracting, would either give a modular form with only finitely-many non-zero $a_p$'s (impossible), or $0$ (giving the desired result).

[Thanks to MF1 for corrections.]

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    $\begingroup$ Yes...the missing $a_p$ is uniquely determined by all of the other $a_q$'s for a newform -- but does this imply that this missing $a_p$ lies in the same field as the other $a_q$'s?? $\endgroup$
    – MF1
    May 23, 2013 at 17:18
  • $\begingroup$ @MF1, sorry to be so cryptic. $\endgroup$ May 23, 2013 at 23:02
  • $\begingroup$ @paul: Nice...this argument shows that the Galois closure of the field generated by the prime Fourier coefficients is unchanged if I drop one Fourier coefficient. But I don't think there is any reason to expect that the Fourier coefficients of a modular form generate an abelian extension. I think the fields they generate can be fairly complicated. I think it's still open whether the field (and not its Galois closure) can get smaller if one drops a single coefficient. $\endgroup$
    – MF1
    May 24, 2013 at 2:27
  • $\begingroup$ @MF1: you may be right about the field generated by individuals... I was inadvertently thinking about the aggregate... $\endgroup$ May 24, 2013 at 2:59
  • $\begingroup$ @paul: actually your argument above is fine (and essentially matches the argument of D. Savitt linked to in the comment above). If every automorphism fixes the missing $a_p$, then $a_p$ is really in the base field (and not its Galois closure). $\endgroup$
    – MF1
    May 25, 2013 at 3:51
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No. Using all but one of the coefficients, it is easy to compute the Hecke operator eigenvalues using just addition, subtraction, multiplication, and division. Then one can compute the missing coefficient using a Hecke operator.

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  • $\begingroup$ I think I see -- I changed the question above to only look at Fourier coefficients at the primes. $\endgroup$
    – MF1
    May 23, 2013 at 16:25

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