Title :
Explicit algorithm to the inverse of Vandermonde Matrix
Author :
Yan, Shaohong ; Yang, Aimin
Author_Institution :
Coll. of Sci., Hebei Polytech. Univ., Tangshan, China
Abstract :
The Inverse matrix of Vandermonde Matrix has been considered to be one of the key components of symbolic computation. In this paper, based on the linear equations theory, a constructive proof of the Lagrange interpolation formula has been given. In the inference process, solving the inverse matrix of Vandermonde matrix is a key point. And then, using the generalized Yang Hui triangle theory, an explicit algorithm for the inverse matrix of Vandermonde matrix was given. Finally, experimental results indicate that this method is more effective than the function INV of MATLAB.
Keywords :
interpolation; matrix algebra; symbol manipulation; Lagrange interpolation formula; Matlab; Vandermonde matrix; explicit algorithm; generalized Yang Hui triangle theory; inverse matrix; linear equations theory; symbolic computation; Curve fitting; Educational institutions; Equations; Inference algorithms; Interpolation; Lagrangian functions; MATLAB; Matrix decomposition; Polynomials; Testing; Lagrange interpolation formula; Vandermonde matrix; explicit algorithm; symbolic computation;
Conference_Titel :
Test and Measurement, 2009. ICTM '09. International Conference on
Conference_Location :
Hong Kong
Print_ISBN :
978-1-4244-4699-5
DOI :
10.1109/ICTM.2009.5413083
