On the structure of order domains

Olav Geil; Ruud Pellikaan

On the structure of order domains

Olav Geil, Ruud Pellikaan

Department of Mathematical Sciences

Research output: Contribution to journal › Journal article › Research › peer-review

53 Citations (Scopus)

Abstract

The notion of an order domain is generalized. The behaviour of an order domain by taking a subalgebra, the extension of scalars, and the tensor product is studied. The relation of an order domain with valuation theory, Gröbner algebras, and graded structures is given. The theory of Gröbner bases for order domains is developed and used to show that the factor ring theorem and its converse, the presentation theorem, hold. The dimension of an order domain is related to the rank of its value semigroup.

Original language	English
Journal	Finite Fields and Their Applications
Volume	8
Pages (from-to)	369-396
ISSN	1071-5797
Publication status	Published - 2002

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title = "On the structure of order domains",

abstract = "The notion of an order domain is generalized. The behaviour of an order domain by taking a subalgebra, the extension of scalars, and the tensor product is studied. The relation of an order domain with valuation theory, Gr{\"o}bner algebras, and graded structures is given. The theory of Gr{\"o}bner bases for order domains is developed and used to show that the factor ring theorem and its converse, the presentation theorem, hold. The dimension of an order domain is related to the rank of its value semigroup.",

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AU - Geil, Olav

AU - Pellikaan, Ruud

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N2 - The notion of an order domain is generalized. The behaviour of an order domain by taking a subalgebra, the extension of scalars, and the tensor product is studied. The relation of an order domain with valuation theory, Gröbner algebras, and graded structures is given. The theory of Gröbner bases for order domains is developed and used to show that the factor ring theorem and its converse, the presentation theorem, hold. The dimension of an order domain is related to the rank of its value semigroup.

AB - The notion of an order domain is generalized. The behaviour of an order domain by taking a subalgebra, the extension of scalars, and the tensor product is studied. The relation of an order domain with valuation theory, Gröbner algebras, and graded structures is given. The theory of Gröbner bases for order domains is developed and used to show that the factor ring theorem and its converse, the presentation theorem, hold. The dimension of an order domain is related to the rank of its value semigroup.

M3 - Journal article

SN - 1071-5797

VL - 8

SP - 369

EP - 396

JO - Finite Fields and Their Applications

JF - Finite Fields and Their Applications

ER -