Unipotent orbits of elements in a quaternion ring of odd order
Abstract
Let n ∈ and let q=pr be an odd prime power. Let R be a finite commutative local principal ring of cardinality qn with R/J(R) GF(q). We study the conjugation action of the group of all unipotent elements in the quaternion ring H(R) on H(R) and we classify the resulting unipotent similarity classes, using a reduction to the ring of 2-by-2 matrices over R.
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