On the computation of polynomial representations of nilpotent Lie groups

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On the computation of polynomial representations of nilpotent Lie groups: a symbolic mathematical approach

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Symposium on Applied Computing archive
Proceedings of the 1997 ACM symposium on Applied computing table of contents

San Jose, California, United States

Pages: 537 - 539

Year of Publication: 1997

ISBN:0-89791-850-9

Authors

Philip Feinsilver	Department of Mathematics, Southern Illinois University, Carbondale, Illinois
Uwe Granz	CRIN-CNRS et Département de Mathématiques, Université de Nancy I, B.P. 239, 54506 Vandoeuvre-lès-Nancy, France
René Schott	CRIN-CNRS, Université de Nancy I, B.P. 239, 54506, Vandoeuvre-lès-Nancy, France

Sponsors

SIGCUE: ACM Special Interest Group on Computer Uses In Education
SIGADA: ACM Special Interest Group on Ada Programming Language
SIGAPP: ACM Special Interest Group on Applied Computing
SIGBIO: ACM Special Interest Group on Biomedical Computing

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ACM New York, NY, USA

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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	N. Bourbaki, Groupes et Alg&bres de Lie, Hermann Paris 1960.
	2	J. Berstel, C. Reutenauer, Les sdries mtionnelles et leurs langages, Masson, Paris 1984.
	3	G. Duchamp, Algorithmes sur les polyn6mes en variables non commutatives, Th~se, Universit~ Pierre et Marie Curie, Paris, 1987.
	4	P. Feinsilver, R. Schott, Special functions and infinite-dimensional representations of Lie groups, Math. Zeit.. 203, 1990, 173-191.
	5	P. Feinsilver, R. Schott, Appell Systems on Lie Groups, Journal of Theoretical Probability, 5, 2, 1992, 251-281.
	6	M. Fliess, Fonctionnelles causales non linaires et ind~termin~es non commutatives, Bulletin Soc. Math. France, 109, 3-40, 1981.
	7	M. Hazewinkel, Lie algebraic methods in filtering and identification, Proceedings of the first World Congress of the Bernoulli Society, 1,749-766, VNU Science Press, 1987.
	8	Richard M. Murray , S. Shankar Sastry , Li Zexiang, A Mathematical Introduction to Robotic Manipulation, CRC Press, Inc., Boca Raton, FL, 1994
	9	X.G. Viennot, Alg&bres de Lie libres et monoi'des libres, Lect. Notes in Math. 691, Springer Verlag, 1974.