Published June 1963
| Version public
Journal Article
Ideal matrices II
Creators
Abstract
In order to make this paper self-contained the definition of ideal matrix is repeated. It is a square matrix of rational integers which transforms a basis for the integers of an algebraic number field (or of an order in such a field) into a basis for an ideal. The aim of this paper is to describe such a matrix from the prime ideal factorization of the corresponding ideal.
Additional Information
© 1963 Springer. (Received December 10, 1962) To B. L. van DER WAERDEN on his sixtieth birthday. This work was carried out (in part) under a grant of the National Science Foundation. Acknowledgment is made to helpful remarks of Professors E. C. DADE (in particular in connection with Theorems 1,7) and A. FRÖHLICH.Additional details
Identifiers
- Eprint ID
- 106211
- DOI
- 10.1007/bf01396991
- Resolver ID
- CaltechAUTHORS:20201022-100904791
Related works
- Describes
- 10.1007/bf01396991 (DOI)
Funding
- NSF
Dates
- Created
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2020-10-22Created from EPrint's datestamp field
- Updated
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2021-11-16Created from EPrint's last_modified field