Construction of Biorthogonal Wavelets by CBC Algorithm

نویسنده

  • Bin Han
چکیده

In applications, it is well known that short support, high vanishing moments and reasonable smoothness are the three most important properties of a biorthogonal wavelet. Based on our previous work on analysis and construction of optimal fundamental reenable functions and optimal biorthogonal wavelets, in this paper, we shall discuss the mutual relations among these three properties. For example, we shall see that any orthogonal scaling function, which is supported on 0; 2r ? 1] s for some positive integer r and has accuracy order r, has Lp (1 p 1) smoothness not exceeding that of the univari-ate Daubechies orthogonal scaling function which is supported on 0; 2r ? 1]. Similar results hold true for fundamental reenable functions and biorthogonal wavelets. Then, we shall discuss the relation between symmetry and the smoothness of a reenable function. Next, we discuss the coset by coset (CBC) algorithm reported in Han 29] to construct biorthogonal wavelets with arbitrary order of vanishing moments. We shall generalize this CBC algorithm to construct bivariate biorthogonal wavelets. For any positive integer k and a bi-variate primal mask a such that a is symmetric about the origin, such CBC algorithm provides us a dual mask of a such that the dual mask satisses the sum rules of order 2k and is also symmetric about the origin. The resulting dual masks have certain optimal properties with respect to their support. Finally, examples of bivariate biorthogonal wavelets constructed by the CBC algorithm are provided to illustrate the general theory. Advantages of the CBC algorithm in this paper over other methods on constructing biorthogonal wavelets are also discussed.

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تاریخ انتشار 1998