Accession Number : AD0642913

Title :   ON CANONICAL BASES OF IDEALS.

Descriptive Note : Technical summary rept.,

Corporate Author : WISCONSIN UNIV MADISON MATHEMATICS RESEARCH CENTER

Personal Author(s) : Mann,Henry B. ; Yamamoto,Koichi

Report Date : SEP 1966

Pagination or Media Count : 12

Abstract : The integral basis omega 1,..., omega n of the algebraic number field F will be called canonical for the ideal A of F if d1 omega 1,...,dn omega n is a modul basis for A where d sub j are rational integers. In this paper the authors show: If A sub 1,...,A sub s are any s ideals of an algebraic number field F then there exists a basis which is canonical for each of the ideals A sub 1,...,A sub s. (Author)

Descriptors :   (*NUMBER THEORY, *ALGEBRA), POLYNOMIALS, RATIONAL NUMBERS

Subject Categories : Theoretical Mathematics

Distribution Statement : APPROVED FOR PUBLIC RELEASE