Let $R\subset S$ be two finitely generated integral domains over an algebraically closed field $k$. If $S$ is finite as $R$-module then $[L:K]<+\infty$, where $L$ and $K$ are the quotient fields of $S$ and $R$, respectively. Does the converse hold true? Any help is well accepted.
2026-04-06 16:14:09.1775492049
Finite ring extensions and finite field extensions
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