An algorithm for finding symmetric Grobner bases in infinite dimensional rings

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An algorithm for finding symmetric Grobner bases in infinite dimensional rings

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International Conference on Symbolic and Algebraic Computation archive
Proceedings of the twenty-first international symposium on Symbolic and algebraic computation table of contents

Linz/Hagenberg, Austria

SESSION: Contributed papers table of contents

Pages 117-124

Year of Publication: 2008

ISBN:978-1-59593-904-3

Authors

Matthias Aschenbrenner	University of California, Los Angeles, Los Angeles, CA, USA
Christopher J. Hillar	Texas A&M University, College Station, TX, USA

Sponsors

SIGSAM: ACM Special Interest Group on Symbolic and Algebraic Manipulation
ACM: Association for Computing Machinery

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ACM New York, NY, USA

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ABSTRACT

A symmetric ideal I ⊂ R = K[x₁,x₂,...] is an ideal that is invariant under the natural action of the infinite symmetric group. We give an explicit algorithm to find Grobner bases for symmetric ideals in the infinite dimensional polynomial ring R. This allows for symbolic computation in a new class of rings. In particular, we solve the ideal membership problem for symmetric ideals of R.

REFERENCES

Note: OCR errors may be found in this Reference List extracted from the full text article. ACM has opted to expose the complete List rather than only correct and linked references.

	1	M. Aschenbrenner and C. J. Hillar. Finite generation of symmetric ideals. Trans. Amer. Math. Soc., 359(11):5171--5192, 2007.
	2	B. Buchberger. Ein algorithmisches Kriterium für die Lösbarkeit eines algebraischen Gleichungssystems. Aequationes Math., 4:374--383, 1970.
	3	David A. Cox , John Little , Donal O'Shea, Ideals, Varieties, and Algorithms: An Introduction to Computational Algebraic Geometry and Commutative Algebra, 3/e (Undergraduate Texts in Mathematics), Springer-Verlag New York, Inc., Secaucus, NJ, 2007
	4	D. A. Cox, J. Little, and D. O'Shea. Using algebraic geometry, volume 185 of Graduate Texts in Mathematics. Springer, New York, second edition, 2005.
	5	M. Drton, B. Sturmfels, and S. Sullivant. Algebraic factor analysis: tetrads, pentads and beyond. Probab. Theory Related Fields, 138(3-4):463--493, 2007.
	6	Jean Charles Faugère, A new efficient algorithm for computing Gröbner bases without reduction to zero (F₅), Proceedings of the 2002 international symposium on Symbolic and algebraic computation, p.75-83, July 07-10, 2002, Lille, France [doi>10.1145/780506.780516]
	7	C. J. Hillar and T. Windfeldt. Minimal generators for symmetric ideals. Proc. Amer. Math. Soc., to appear.
	8	A. Mead, E. Ruch, and A. Schönhofer. Theory of chirality functions, generalized for molecules with chiral ligands. Theor. Chim. Acta, 29:269--304, 1973.
	9	E. Ruch and A. Schönhofer. Theorie der chiralit\"atsfunktionen. Theor. Chim. Acta, 19:225--287, 1970.
	10	E. Ruch, A. Schönhofer, and I. Ugi. Die vandermondesche determinante als n\"aherungsansatz für eine chiralit\"atsbeobachtung, ihre verwendung in der stereochemie und zur berechnung der optischen aktivitat. Theor. Chim. Acta, 7:420--432, 1967.