Let $D=\mathbb Q[[x]]$ and let $Q$ be the field of fractions of $D$. Set $V=Q/D$. The ring is the trivial extension $T(D, V)$
Keywords power series ring trivial extension
Name | Measure | |
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cardinality | $\mathfrak c$ | |
composition length | left: $\infty$ | right: $\infty$ |
Krull dimension (classical) | 1 |
Name | Description |
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Idempotents | $\{0,1\}$ |