Ideal norm

Results: 8



#Item
1MATH 210A PRACTICE MIDTERM 1. √ Recall that the Gaussian integers Z[i] form a euclidean domain (with norm |a + bi| = a2 + b2 ), and thus a principal ideal domain. State the classification theorem for finitelygenerated

MATH 210A PRACTICE MIDTERM 1. √ Recall that the Gaussian integers Z[i] form a euclidean domain (with norm |a + bi| = a2 + b2 ), and thus a principal ideal domain. State the classification theorem for finitelygenerated

Add to Reading List

Source URL: math.stanford.edu

- Date: 2014-11-02 19:33:32
    2An  Internal  Problem  for  Ideal  Theory   David  Wiens     Abstract.  The  prevailing  methodological  view  among  normative  political   philosophers  can  be

    An  Internal  Problem  for  Ideal  Theory   David  Wiens     Abstract.  The  prevailing  methodological  view  among  normative  political   philosophers  can  be

    Add to Reading List

    Source URL: philosophy.ucsd.edu

    Language: English - Date: 2014-03-03 12:10:29
    3THE EUCLIDEAN ALGORITHM IN ALGEBRAIC NUMBER FIELDS FRANZ LEMMERMEYER Abstract. This article, which is an update of a version published 1995 in Expo. Math., intends to survey what is known about Euclidean number fields;

    THE EUCLIDEAN ALGORITHM IN ALGEBRAIC NUMBER FIELDS FRANZ LEMMERMEYER Abstract. This article, which is an update of a version published 1995 in Expo. Math., intends to survey what is known about Euclidean number fields;

    Add to Reading List

    Source URL: www.fen.bilkent.edu.tr

    Language: English - Date: 2004-02-13 18:30:23
    4Index k-algebra center of a, 4 central, 8 definition, 3

    Index k-algebra center of a, 4 central, 8 definition, 3

    Add to Reading List

    Source URL: www.ams.org

    Language: English - Date: 2013-05-30 09:14:56
    5MP473 Examination, November 2000 Time: 3 hours Answer all questions 1. (a) Explain what is meant by the statements: (i) K is an algebraic number field of degree n, (ii) ω1 , . . . , ωn is an integral basis for K,

    MP473 Examination, November 2000 Time: 3 hours Answer all questions 1. (a) Explain what is meant by the statements: (i) K is an algebraic number field of degree n, (ii) ω1 , . . . , ωn is an integral basis for K,

    Add to Reading List

    Source URL: www.numbertheory.org

    Language: English - Date: 2000-11-16 18:40:58
    6THE DIRICHLET CLASS NUMBER FORMULA FOR IMAGINARY QUADRATIC FIELDS The factorizations 6 = 2 · 3 = (1 +

    THE DIRICHLET CLASS NUMBER FORMULA FOR IMAGINARY QUADRATIC FIELDS The factorizations 6 = 2 · 3 = (1 +

    Add to Reading List

    Source URL: people.reed.edu

    Language: English - Date: 2014-04-10 09:31:43
    7A Principal Ideal Ring That Is Not a Euclidean Ring Author(s): Jack C. Wilson Reviewed work(s):

    A Principal Ideal Ring That Is Not a Euclidean Ring Author(s): Jack C. Wilson Reviewed work(s):

    Add to Reading List

    Source URL: www.math.buffalo.edu

    Language: English - Date: 2011-11-08 11:56:09
    8FACTORING IN QUADRATIC FIELDS KEITH CONRAD

    FACTORING IN QUADRATIC FIELDS KEITH CONRAD

    Add to Reading List

    Source URL: www.math.uconn.edu

    Language: English - Date: 2013-05-03 19:32:37