Abstract
AbstractLet f be a primitive Hilbert modular form over F of weight k with coefficient field
$E_f$
, generated by the Fourier coefficients
$C(\mathfrak {p}, f)$
for
$\mathfrak {p} \in \mathrm {Spec}(\mathcal {O}_F)$
. Under certain assumptions on the image of the residual Galois representations attached to f, we calculate the Dirichlet density of
$\{\mathfrak {p} \in \mathrm {Spec}(\mathcal {O}_F)| E_f = \mathbb {Q}(C(\mathfrak {p}, f))\}$
. For
$k=2$
, we show that those assumptions are satisfied when
$[E_f:\mathbb {Q}] = [F:\mathbb {Q}]$
is an odd prime. We also study analogous results for
$F_f$
, the fixed field of
$E_f$
by the set of all inner twists of f. Then, we provide some examples of f to support our results. Finally, we compute the density of
$\{\mathfrak {p} \in \mathrm {Spec}(\mathcal {O}_F)| C(\mathfrak {p}, f) \in K\}$
for fields K with
$F_f \subseteq K \subseteq E_f$
.
Publisher
Canadian Mathematical Society