Bivariate constrained wavelet approximation
Abstract
Shape-preserving properties of some naturally arising bivariate wavelet operators Bn are examined. Namely, let f∈Ck(R2), k > 0, r, s≥ 0, all integers such that r + s = k. If ∂ r+s{cauchy integral} (∂ xr∂ ys)(x,y)≥ 0, then it is proved, under mild conditions of Bn, that ∂ r+s (∂ xr∂ ys)Bn({cauchy integral})(x,y)≥ 0; also pointwise converge of Bn({cauchy integral}) to {cauchy integral} is given with rates through a Jackson-type inequality. Associated simultaneous shape-preserving results are also presented for special type of wavelet operators Bn. © 1994.
Department(s)
Mathematics
Document Type
Article
DOI
https://doi.org/10.1016/0377-0427(92)00131-R
Keywords
Bivariate approximation, Local modulus of continuity, Shape-preserving approximation, Wavelets (simultaneous)
Publication Date
7-29-1994
Recommended Citation
Anastassiou, George, and X. M. Yu. "Bivariate constrained wavelet approximation." Journal of computational and applied mathematics 53, no. 1 (1994): 1-9.
Journal Title
Journal of Computational and Applied Mathematics
