Abstract
We prove the existence of certain rationally rigid triples in
F
4
(
p
)
for good primes p
(i.e.,
p
>
3
), thereby showing that these groups occur as regular Galois groups over
Q
(
t
)
and so also over
Q
. We show that these triples give rise to rigid triples in the algebraic group and prove that they generate an interesting subgroup in characteristic 0.
Page:
48-48
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