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bn:00230968n
Noun Named Entity
Categories: Hermann Minkowski, Articles with short description, Quadratic forms, Theorems in number theory
EN
Hasse–Minkowski theorem  Hasse-Minkowski theorem
EN
The Hasse–Minkowski theorem is a fundamental result in number theory which states that two quadratic forms over a number field are equivalent if and only if they are equivalent locally at all places, i.e. equivalent over every completion of the field. Wikipedia
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EN
The Hasse–Minkowski theorem is a fundamental result in number theory which states that two quadratic forms over a number field are equivalent if and only if they are equivalent locally at all places, i.e. equivalent over every completion of the field. Wikipedia
two quadratic forms over a number field are equivalent iff they are equivalent locally Wikidata
IS A
theorem
Wikipedia
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Hasse–Minkowski theorem
Wikidata
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Hasse–Minkowski theorem
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Hasse-Minkowski theorem

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