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The canonical rational form helps us to parametrize the conjugacy classes in $GL(n)$ over any commutative field.
How can we parametriize the conjugacy classes in $SL_n(k)$, where $k$ is an arbitrary locally compact field or a global field?
How can we parametriize the conjugacy classes in $SL_n(k)$, where $k$ is an arbitrary locally compact field?
How can we parametriize the conjugacy classes in $SL_n(k)$, where $k$ is an arbitrary commutativelocally compact field?
How can we parametriize the conjugacy classes in $SL_n(k)$, where $k$ is an arbitrary commutative field?
The canonical rational form helps us to parametrize the conjugacy classes in $GL(n)$ over any commutative field. What is possible for $SL(n)$?
