The Use of Semi Inherited LU Factorization of Matrices in Interpolation of Data
محورهای موضوعی : Operation ResearchMohamm Ali Fariborzi Araghi 1 , Amir Fallahzadeh 2
1 - Department of mathematics, Islamic Azad University,Central Tehran Branch,Tehran, Iran
2 - Department of mathematics, Islamic Azad University,Central Tehran Branch,Tehran, Iran
کلید واژه: Semi Inherited LU factorization, Interpolation matrix, Semi inherited interpolation,
چکیده مقاله :
The polynomial interpolation in one dimensional space R is an important method to approximate the functions. The Lagrange and Newton methods are two well known types of interpolations. In this work, we describe the semi inherited interpolation for approximating the values of a function. In this case, the interpolation matrix has the semi inherited LU factorization.
The polynomial interpolation in one dimensional space R is an important method to approximate the functions. The Lagrange and Newton methods are two well known types of interpolations. In this work, we describe the semi inherited interpolation for approximating the values of a function. In this case, the interpolation matrix has the semi inherited LU factorization.
[1] Arav, M., Bevis, J. and Hall, F. J., Inherited LU-factorization of matrices, Linear Algebra, and it's Application 427, 16-41, 2007.
[2] Cheney, W., and Light, W., A course in approximation theory, Brooks/Cole Publishing Company, Pacific Grove, California, 2000.
[3] Demmel, J. W., Applied Numerical Linear Algebra, SIAM, Society for Industrial and Applied Mathematics, 1997.
[4] Gill, P. E., Murray, W., and Wright, M. H., Numerical Linear Algebra and Optimization, Addison-Wesley Publishing Company, Redwood City, California, 1991.
[5] Johnson, C. R., Olesky, D. D. and Van den Driessche, P., Inherited matrix entries: LU factorization, SIAM J. Matrix Anal. Appl, 10, 97-104, 1989.
[6] Lay, D. C., Linear Algebra and Its Applications, Third Edition, Addison Wesley, Boston, 2003.
[7] Powell, M. J. D., Approximation theory and methods, Cambridge University Press, 1996.
[8] Rivlin, T. J., An Introduction to the Approximation of Functions, Blaisdell Publishing Company, Waltham, 1969.
