Self-Similar Tiling Multiresolution Analysis and Self-Similar Tiling Wavelet Basis(Special Section on Digital Signal Processing)
スポンサーリンク
概要
- 論文の詳細を見る
We show that characteristic functions of elements of self-similar tilings can be used as scaling functions of multiresolution analysis of L^2(R^n). This multiresolution analysis is a generalization of a self-affine tiling multiresolution analysis using a characteristic function of element of self-affine tiling as a scaling function. We give a method of constructing a wavelet basis which realizes such an MRA.
- 社団法人電子情報通信学会の論文
- 1998-08-25
著者
-
OGAWA Hidemitsu
Department of Computer Science, Graduate School of Information Science and Engineering, Tokyo Instit
-
LI Mang
Department of Information Engineering, Faculty of Engineering, Niigata University
-
YAMASAKI Issei
Department of Information Engineering, Faculty of Engineering, Niigata University
-
Ogawa Hidemitsu
Department Of Computer Science Graduate School Of Information Science And Engineering Tokyo Institut
-
Li Mang
Department Of Information Engineering Faculty Of Engineering Niigata University:(present Address)nih
-
Yamasaki I
Department Of Information Engineering Faculty Of Engineering Niigata University
関連論文
- Noise suppression in training examples for improving generalization capability
- Self-Similar Tiling Multiresolution Analysis and Self-Similar Tiling Wavelet Basis(Special Section on Digital Signal Processing)
- Paley-Wiener Multiresolution Analysis and Paley-Wiener Wavelet Frame
- General Frame Multiresolution Analysis and Its Wavelet Frame Representation
- Optimal design of regularization term and regularization parameter by subspace information criterion