Sets of lengths in V +XB [X] domains
Source
The Arabian Journal for Science and Engineering. Section C, Theme issues
Issue
Vol. 26, Issue 1C (31 Dec. 2001), pp.69-82, 14 p.
Publisher
King Fahd University of Petroleum and Minerals
Publication Date
2001-12-31
Country of Publication
Saudi Arabia
No. of Pages
14
Main Subjects
Engineering & Technology Sciences (Multidisciplinary)
Abstract EN
In this paper, we investigate factorization properties in domains of type V + XB[X], where B is the integral closure of V in a finite algebraic extension of the quotient field of V.
We place particular emphasis on the case where V is a discrete valuation ring in which the unique up to associate irreducible element p of V ramifies in B.
More precisely, we compute in this case the sets of lengths of the elements of V + XB[X] and, in some cases, the generalized sets of lengths.
American Psychological Association (APA)
Chapman, Scott T.& Gonzalez, Nathalie& Pellerin, Sebastien. 2001. Sets of lengths in V +XB [X] domains. The Arabian Journal for Science and Engineering. Section C, Theme issues،Vol. 26, no. 1C, pp.69-82.
https://search.emarefa.net/detail/BIM-389373
Modern Language Association (MLA)
Chapman, Scott T.…[et al.]. Sets of lengths in V +XB [X] domains. The Arabian Journal for Science and Engineering. Section C, Theme issues Vol. 26, no. 1C (Dec. 2001), pp.69-82.
https://search.emarefa.net/detail/BIM-389373
American Medical Association (AMA)
Chapman, Scott T.& Gonzalez, Nathalie& Pellerin, Sebastien. Sets of lengths in V +XB [X] domains. The Arabian Journal for Science and Engineering. Section C, Theme issues. 2001. Vol. 26, no. 1C, pp.69-82.
https://search.emarefa.net/detail/BIM-389373
Data Type
Journal Articles
Language
English
Notes
Includes bibliographical references : p. 81-82
Record ID
BIM-389373
