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Decomposition and Approximation of Multivariate Functions on the Cube
张之华
Decomposition and Approximation of Multivariate Functions on the Cube
Zhi Hua ZHANG
College of Global Change and Earth System Science, Beijing Normal University, Beijing 100875, P. R. China
ABSTRACT In this paper, we present a decomposition method of multivariate functions. This method shows that any multivariate function f on [0, 1] d is a finite sum of the form Σ j ? j ψ j , where each ? j can be extended to a smooth periodic function, each ψ j is an algebraic polynomial, and each φ j ψ j is a product of separated variable type and its smoothness is same as f. Since any smooth periodic function can be approximated well by trigonometric polynomials, using our decomposition method, we find that any smooth multivariate function on [0, 1] d can be approximated well by a combination of algebraic polynomials and trigonometric polynomials. Meanwhile, we give a precise estimate of the approximation error.
KEY WORDS: Decomposition of multivariate functions, approximation of multivariate functions, fundamental polynomial, projection operator, classification of boundary points PUBLISHED IN: ACTA MATHEMATICA SINICA, ENGLISH SERIES, 2013, 29 (1): 119-136.
DOWNLOAD PDF: http://link.springer.com/content/pdf/10.1007%2Fs10114-012-1014-2.pdf
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