The exponent 2-class-group problem for non-Galois over \(\mathbb{Q}\) quartic fields that are quadratic extensions of imaginary quadratic fields (Q1340268)
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scientific article; zbMATH DE number 701296
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | The exponent 2-class-group problem for non-Galois over \(\mathbb{Q}\) quartic fields that are quadratic extensions of imaginary quadratic fields |
scientific article; zbMATH DE number 701296 |
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The exponent 2-class-group problem for non-Galois over \(\mathbb{Q}\) quartic fields that are quadratic extensions of imaginary quadratic fields (English)
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19 January 1995
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The author shows that a certain family of quartic fields possesses exactly 14 fields with ideal class groups of exponent \(\leq 2\).
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quartic fields
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ideal class groups of exponent \(\leq 2\)
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0.92264456
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0.9110265
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0.9098296
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0.90968895
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