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Let F be a field of characteristic ≠2, D be a quaternion division algebra over F, and Q be a subgroup of the additive group of D which satisfies the following two conditions:
| 1. | Q contains a subfield k of F such that D is algebraic over k. | ||||
| 2. | Q ⊈ F. | ||||
Let n be an integer, n ≥ 2. We study the completely reducible subgroups of GL
n
(D) that comprise a conjugate in GL
n
(D) of the group of all matrices diag(, 1,…, 1) ∈ GL
n
(D), a ∈ Q.
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