Let $F_2$ be the field of two elements, and $R$ be the subring of matrices in $M_4(F_2)$ of the form $\begin{bmatrix} a&0&b&c\\ 0&a&0&d\\ 0&0&a&0\\ 0&0&0&e\end{bmatrix}$
Notes: The field does not have to be finite for the asymmetry of Kasch property: it can be any division ring.
Keywords matrix ring subring
| Name | Measure | |
|---|---|---|
| cardinality | 32 | |
| composition length | left: 5 | right: 5 |
| Krull dimension (classical) | 0 |
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