"algebraically closed" meaning in All languages combined

See algebraically closed on Wiktionary

Adjective [English]

Head templates: {{en-adj|-}} algebraically closed (not comparable)
  1. (algebra, field theory, of a field) Which contains as an element every root of every nonconstant univariate polynomial definable over it (i.e., over said field). Tags: not-comparable Categories (topical): Algebra Translations (that contains among its elements every root of every nonconstant single-variable polynomial definable over it): algébriquement clos (French), algebricamente chiuso (Italian), algebraiskt lukket (Norwegian), algebricamente fechado (Portuguese), algebraicamente cerrado (Spanish), algebraiskt sluten (Swedish)
    Sense id: en-algebraically_closed-en-adj-oQ59L7qL Topics: algebra, mathematics, sciences Disambiguation of 'that contains among its elements every root of every nonconstant single-variable polynomial definable over it': 86 14
  2. (algebra, group theory, of a group) Such that any finite set of equations and inequations has a solution. Tags: not-comparable Categories (topical): Algebra, Group theory
    Sense id: en-algebraically_closed-en-adj-jqN3danX Categories (other): English entries with incorrect language header, Entries with translation boxes, Pages with 1 entry, Pages with entries, Terms with French translations, Terms with Italian translations, Terms with Norwegian translations, Terms with Portuguese translations, Terms with Spanish translations, Terms with Swedish translations Disambiguation of English entries with incorrect language header: 29 71 Disambiguation of Entries with translation boxes: 43 57 Disambiguation of Pages with 1 entry: 32 68 Disambiguation of Pages with entries: 26 74 Disambiguation of Terms with French translations: 38 62 Disambiguation of Terms with Italian translations: 32 68 Disambiguation of Terms with Norwegian translations: 33 67 Disambiguation of Terms with Portuguese translations: 33 67 Disambiguation of Terms with Spanish translations: 33 67 Disambiguation of Terms with Swedish translations: 34 66 Topics: algebra, group-theory, mathematics, sciences
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          "text": "The fundamental theorem of algebra states that the field of complex numbers, #x5C;mathbb#x7B;C#x7D;, is algebraically closed.",
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        {
          "ref": "2007, Pierre Antoine Grillet, Abstract Algebra, 2nd edition, Springer, page 166:",
          "text": "Definition. A field is algebraically closed when it satisfies the equivalent conditions in Proposition 4.1. #x5C;square\nFor instance, the fundamental theorem of algebra (Theorem III.8.11) states that #x5C;Complex is algebraically closed. The fields #x5C;R, #x5C;Q, #x5C;Z#x5F;p, are not algebraically closed, but #x5C;R and #x5C;Q can be embedded into the algebraically closed field #x5C;Complex.",
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          "ref": "2008, M. Ram Murty, Problems in Analytic Number Theory, 2nd edition, Springer, page 155:",
          "text": "In many ways #x5C;Q#x5F;p is analogous to #x5C;R. For example, #x5C;R is not algebraically closed. The exercises below show that #x5C;Q#x5F;p is not algebraically closed. However, by adjoining i#x3D;#x5C;sqrt#x7B;-1#x7D; to #x5C;R, we get the field of complex numbers, which is algebraically closed. In contrast, the algebraic closure #x5C;overline#x5C;Q#x5F;p of #x5C;Q#x5F;p is not of finite degree over #x5C;Q. Moreover, #x5C;Complex is complete with respect to the extension of the usual norm of #x5C;R. Unfortunately, #x5C;overline#x5C;Q#x5F;p is not complete with respect to the extension of the p-adic norm. So after completing it (via the usual method of Cauchy sequences) we get a still larger field, usually denoted by #x5C;Complex#x5F;p, and it turns out to be both algebraically closed and complete.",
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          "ref": "2015, Martyn R. Dixon, Leonid A. Kurdachenko, Igor Ya Subbotin, An Introduction to Essential Algebraic Structures, Wiley, page 195:",
          "text": "Definition 5.3.14. Let F be a field. A field extension P is called an algebraic closure of F if P is algebraically closed and every proper subfield of P containing F is not algebraically closed.\nIn other words, the algebraic closure of F is the minimal algebraically closed field containing F.",
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        "(algebra, field theory, of a field) Which contains as an element every root of every nonconstant univariate polynomial definable over it (i.e., over said field)."
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          "_dis1": "86 14",
          "code": "it",
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          "sense": "that contains among its elements every root of every nonconstant single-variable polynomial definable over it",
          "word": "algebricamente chiuso"
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          "_dis1": "86 14",
          "code": "no",
          "lang": "Norwegian",
          "sense": "that contains among its elements every root of every nonconstant single-variable polynomial definable over it",
          "word": "algebraiskt lukket"
        },
        {
          "_dis1": "86 14",
          "code": "pt",
          "lang": "Portuguese",
          "sense": "that contains among its elements every root of every nonconstant single-variable polynomial definable over it",
          "word": "algebricamente fechado"
        },
        {
          "_dis1": "86 14",
          "code": "es",
          "lang": "Spanish",
          "sense": "that contains among its elements every root of every nonconstant single-variable polynomial definable over it",
          "word": "algebraicamente cerrado"
        },
        {
          "_dis1": "86 14",
          "code": "sv",
          "lang": "Swedish",
          "sense": "that contains among its elements every root of every nonconstant single-variable polynomial definable over it",
          "word": "algebraiskt sluten"
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          "text": "The fundamental theorem of algebra states that the field of complex numbers, #x5C;mathbb#x7B;C#x7D;, is algebraically closed.",
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          "ref": "2007, Pierre Antoine Grillet, Abstract Algebra, 2nd edition, Springer, page 166:",
          "text": "Definition. A field is algebraically closed when it satisfies the equivalent conditions in Proposition 4.1. #x5C;square\nFor instance, the fundamental theorem of algebra (Theorem III.8.11) states that #x5C;Complex is algebraically closed. The fields #x5C;R, #x5C;Q, #x5C;Z#x5F;p, are not algebraically closed, but #x5C;R and #x5C;Q can be embedded into the algebraically closed field #x5C;Complex.",
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          "text": "Definition 5.3.14. Let F be a field. A field extension P is called an algebraic closure of F if P is algebraically closed and every proper subfield of P containing F is not algebraically closed.\nIn other words, the algebraic closure of F is the minimal algebraically closed field containing F.",
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    {
      "code": "fr",
      "lang": "French",
      "sense": "that contains among its elements every root of every nonconstant single-variable polynomial definable over it",
      "word": "algébriquement clos"
    },
    {
      "code": "it",
      "lang": "Italian",
      "sense": "that contains among its elements every root of every nonconstant single-variable polynomial definable over it",
      "word": "algebricamente chiuso"
    },
    {
      "code": "no",
      "lang": "Norwegian",
      "sense": "that contains among its elements every root of every nonconstant single-variable polynomial definable over it",
      "word": "algebraiskt lukket"
    },
    {
      "code": "pt",
      "lang": "Portuguese",
      "sense": "that contains among its elements every root of every nonconstant single-variable polynomial definable over it",
      "word": "algebricamente fechado"
    },
    {
      "code": "es",
      "lang": "Spanish",
      "sense": "that contains among its elements every root of every nonconstant single-variable polynomial definable over it",
      "word": "algebraicamente cerrado"
    },
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      "sense": "that contains among its elements every root of every nonconstant single-variable polynomial definable over it",
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This page is a part of the kaikki.org machine-readable All languages combined dictionary. This dictionary is based on structured data extracted on 2024-12-21 from the enwiktionary dump dated 2024-12-04 using wiktextract (d8cb2f3 and 4e554ae). The data shown on this site has been post-processed and various details (e.g., extra categories) removed, some information disambiguated, and additional data merged from other sources. See the raw data download page for the unprocessed wiktextract data.

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