Abstract
In some fields such as Mathematics Mechanization, automated reasoning and Trustworthy Computing, etc., exact results are needed. Symbolic computations are used to obtain the exact results. Symbolic computations are of high complexity. In order to improve the situation, exact interpolating methods are often proposed for the exact results and approximate interpolating methods for the approximate ones. In this paper, the authors study how to obtain exact interpolation polynomial with rational coefficients by approximate interpolating methods.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
R. M. Corless, et al., Towards factoring bivariate approximate polynomials, Proc. ISSAC, ACM Press, New York, 2001.
Y. Huang, et al., Pseudofactors of multivariate polynomials, Proc. ISSAC, ACM Press, New York, 2000.
Z. Mou-Yan and R. Unbehausen, Approximate factorization of multivariable polynomials, Signal Proces., 1988, 14: 141–152.
T. Sasaki, et al., Approximate factorization of multivariate polynomials and absolute irreducibility testing, Japan J. Indust. Appl. Math., 1991, 8: 357–375.
T. Sasaki, Approximate multivariate polynomial factorization based on zero-sum relations, Proc. ISSAC, ACM Press, New York, 2001.
T. Sasaki, T. Saito, and T. Hilano, Analysis of approximate factorization algorithm, Japan J. Indust. Appl. Math., 1992, 9: 351–368.
R. M. Corless, et al., The singular value decomposition for polynomial systems, Proc. ISSAC, ACM Press, New York, 1995.
B. Beckermann and G. Labahn, When are two numerical polynomials relatively prime? J. Symbolic Comput., 1998, 26: 677–689.
N. Karmarka and Y. N. Lakshman, Approximate polynomial greatest common divisors and nearest singular polynomials, Proc. ISSAC, ACM Press, New York, 1996.
R. M. Corless, M. W. Stephen, and L. H. Zhi, QR factoring to compute the gcd of univariate approximate polynomials, IEEE Transactions on Signal Processing, 2004, 52(12): 3394–3402.
R. M. Corless, et al., Approximate polynomial decomposition, Proc. ISSAC, ACM Press, New York, 1999.
A. Galligo and S. M. Watt, A numerical absolute primality test for bivariate polynomials, Proc. ISSAC, ACM Press, New York, 1997.
G. Reid and L. H. Zhi, Solving nonlinear polynomial system via symbolic-numeric elimination method, Proc. International Conference on Polynomial System Solving, 2004.
R. M. Corless, et al., Numerical implicitization of parametric hypersurfaces with linear algebra, Proc. Artificial Intelligence with Symbolic Computation 2000, Lecture Notes in Artificial Intelligence, Springer-Verlag, Berlin, 2000.
G. Chèze and A. Galligo, From an approximate to an exact absolute polynomial factorization, J. Symbolic Comput., 2006, 41(6): 682–696.
E. Kaltofen, and L. Yagati, Improved sparse mutivariate polynomial interpolation algorithms, Proc. ISSAC, ACM Press, New York, 1988.
D. Manocha, Efficient algorithms for multipolynomial resultant, The Computer Journal, 1993, 36(5): 485–496.
M. Giesbrecht, G. Labahn, and W. S. Lee, Symbolic-numeric sparse interpolation of multivariate polynomials, Proc. ISSAC, ACM Press, New York, 2006.
A. Marco and J. J. Martinez, Parallel computation of determinants of matrices with polynomial entries, J. Symbolic Comput., 2004, 37(6): 749–760.
T. Saxena, Efficient Variable Elimination Using Resultants, State University of New York, Albany, 1997.
Y. Feng and Y. H. Li, Checking rsc criteria for extended dixon resultant by interpolation method, Proc. 7th International Symposium on Symbolic and Numeric Algorithms for Scientific Computing, IEEE Computer Society Press, 2005.
Y. Feng and Y. H. Li, Computing extended dixon resultant by interpolation method, Proc. Symbolic-Numeric Computation, 2005.
C. D. Boor, Polynomial Interpolation in Several Variables, in Studies in Computer Science (in Honor of Samuel D. Conte), R. DeMillo and J. R. Rice (eds.), Plenum Press, New York, 1994.
J. Z. Zhang and Y. Feng, Obtaining exact value by approximate computations, Science in China Series A: Mathematics, 2007, 50(9): 1361–1368.
R. A. Horn and C. R. Johnson, Topics in Matrix Analysis, Cambridge University Press, Cambridge, 1991.
J. W. Brewer, Kronecker products and matrix calculus in system theory, IEEE Transactions on Circuits and Systems, 1978.
X. K. Zhang and P. H. Xu, Higher Algebra, 2nd ed., Tsinghua University Press, Beijing, 2004.
R. A. Brualdi, Introductory Combinatorics, North-Holland Publishing Company, New York, 1977.
Author information
Authors and Affiliations
Corresponding author
Additional information
This research is supported by China 973 Program 2011CB302402, the Knowledge Innovation Program of the Chinese Academy of Sciences (KJCX2-YW-S02), the National Natural Science Foundation of China (10771205), and the West Light Foundation of the Chinese Academy of Sciences.
This paper was recommended for publication by Editor Ziming LI.
Rights and permissions
About this article
Cite this article
Feng, Y., Qin, X., Zhang, J. et al. Obtaining exact interpolation multivariate polynomial by approximation. J Syst Sci Complex 24, 803–815 (2011). https://doi.org/10.1007/s11424-011-8312-0
Received:
Revised:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s11424-011-8312-0