Non-commutative reduction rings

Klaus Madlener; Birgit Reinert

Published

1999-01-01

Non-commutative reduction rings

Keywords:

Reduction rings, Gröbner bases, non-commutative rings, standard ring constructions (es)

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Authors

Klaus Madlener Universität Kaiserslautern
Birgit Reinert Universität Kaiserslautern

Abstract (es)

Reduction relations are means to express congruences on rings. In the special case of congruences induced by ideals in commutative polynomial rings, the powerful tool of Grabner bases can be characterized by properties of reduction relations associated with ideal bases. Hence, reduction rings can be seen as rings with reduction relations associated to subsets of the ring such that every finitely generated ideal has a finite Gröbner basis. This paper gives an axiomatic framework for studying reduction rings including non-commutative rings and explores when and how the property of being a reduction ring is preserved by standard ring constructions such as quotients and sums of reduction rings, as well as extensions to polynomial and monoid rings over reduction rings.

Moreover, it is outlined when such reduction rings are effective

How to Cite

APA

Madlener, K. and Reinert, B. (1999). Non-commutative reduction rings. Revista Colombiana de Matemáticas, 33(1), 27–49. https://revistas.unal.edu.co/index.php/recolma/article/view/33745

ACM

[1]

Madlener, K. and Reinert, B. 1999. Non-commutative reduction rings. Revista Colombiana de Matemáticas. 33, 1 (Jan. 1999), 27–49.

ACS

(1)

Madlener, K.; Reinert, B. Non-commutative reduction rings. rev.colomb.mat 1999, 33, 27-49.

ABNT

MADLENER, K.; REINERT, B. Non-commutative reduction rings. Revista Colombiana de Matemáticas, [S. l.], v. 33, n. 1, p. 27–49, 1999. Disponível em: https://revistas.unal.edu.co/index.php/recolma/article/view/33745. Acesso em: 2 feb. 2025.

Chicago

Madlener, Klaus, and Birgit Reinert. 1999. “Non-commutative reduction rings”. Revista Colombiana De Matemáticas 33 (1):27-49. https://revistas.unal.edu.co/index.php/recolma/article/view/33745.

Harvard

Madlener, K. and Reinert, B. (1999) “Non-commutative reduction rings”, Revista Colombiana de Matemáticas, 33(1), pp. 27–49. Available at: https://revistas.unal.edu.co/index.php/recolma/article/view/33745 (Accessed: 2 February 2025).

IEEE

[1]

K. Madlener and B. Reinert, “Non-commutative reduction rings”, rev.colomb.mat, vol. 33, no. 1, pp. 27–49, Jan. 1999.

MLA

Madlener, K., and B. Reinert. “Non-commutative reduction rings”. Revista Colombiana de Matemáticas, vol. 33, no. 1, Jan. 1999, pp. 27-49, https://revistas.unal.edu.co/index.php/recolma/article/view/33745.

Turabian

Madlener, Klaus, and Birgit Reinert. “Non-commutative reduction rings”. Revista Colombiana de Matemáticas 33, no. 1 (January 1, 1999): 27–49. Accessed February 2, 2025. https://revistas.unal.edu.co/index.php/recolma/article/view/33745.

Vancouver

1.

Madlener K, Reinert B. Non-commutative reduction rings. rev.colomb.mat [Internet]. 1999 Jan. 1 [cited 2025 Feb. 2];33(1):27-49. Available from: https://revistas.unal.edu.co/index.php/recolma/article/view/33745