摘要
Daubechies小波基和多小波基都是建立在 L2 (R)或 L2 (Rn)上 .一种定义在平面离散点集 {x1 ,… ,xn}{y1 ,… ,yn} R2 上的类似于多小波的准小波基被研究 ,它与通常小波基的差别在于不是由 V0 空间的一个函数通过伸缩平移构成而仅仅是类似 .如果已知一个函数在平面离散点集上的值而要表示这个函数时 ,使用这种准小波基更方便 .
The Daubechies wavelet bases and the multi wavelet base lie in the space of square integrable function L 2(R)or L 2(R n). An analogue of the multi wavelet bases which lie in the space of functions defined on a discrete set of points {x 1,...,x n}×{y 1,...,y n}R 2 is taken into account. The structure of this analogue is essentially similar to that of the multi wavelet bases, but the construction is more convenient when the representation of a function and its related operators are based on its values at {x 1,...,x n}×{y 1,...,y n}R 2 . Such representation in finite difference computation and some integral equations proved to be more useful.
出处
《西安建筑科技大学学报(自然科学版)》
CSCD
2002年第3期299-301,共3页
Journal of Xi'an University of Architecture & Technology(Natural Science Edition)
