Difference between revisions of "Purely inseparable extension"
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| + | A [[field extension]] $L/K$ in finite characteristic $p$ in which every element of $L$ which is algebraic over $K$ is a purely inseparable element: that is, has a minimal polynomial of the form $X^{p^e} - a$ where $a \in K$. | ||
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| + | Let $E/K$ be an arbitrary algebraic extension. The elements of the field $E$ that are separable over $K$ form a field, $S$, which is the maximal [[separable extension]] of $K$ contained in $E$. Then $S/K$ is a separable extension and $E/S$ is a purely inseparable extension. | ||
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| + | The purely inseparable extensions of a field $k$ form a [[distinguished class of extensions]]. | ||
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| + | The ''exponent of a purely inseparable extension'' $L/K$ is the minimum $e$, if it exists, such that $L^{p^e} \subseteq K$. | ||
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| + | See also: [[Separable extension]] | ||
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| + | ====References==== | ||
| + | * N. Jacobson, "Lectures in Abstract Algebra: III. Theory of Fields and Galois Theory" Graduate Texts in Mathematics '''32''' Springer (1980) ISBN 0-387-90124-8 {{ZBL|0455.12001}} | ||
Revision as of 20:27, 8 November 2016
2020 Mathematics Subject Classification: Primary: 12F15 [MSN][ZBL]
A field extension $L/K$ in finite characteristic $p$ in which every element of $L$ which is algebraic over $K$ is a purely inseparable element: that is, has a minimal polynomial of the form $X^{p^e} - a$ where $a \in K$.
Let $E/K$ be an arbitrary algebraic extension. The elements of the field $E$ that are separable over $K$ form a field, $S$, which is the maximal separable extension of $K$ contained in $E$. Then $S/K$ is a separable extension and $E/S$ is a purely inseparable extension.
The purely inseparable extensions of a field $k$ form a distinguished class of extensions.
The exponent of a purely inseparable extension $L/K$ is the minimum $e$, if it exists, such that $L^{p^e} \subseteq K$.
See also: Separable extension
References
- N. Jacobson, "Lectures in Abstract Algebra: III. Theory of Fields and Galois Theory" Graduate Texts in Mathematics 32 Springer (1980) ISBN 0-387-90124-8 Zbl 0455.12001
Purely inseparable extension. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Purely_inseparable_extension&oldid=39708