Factorable M-dimensional filters are interesting because they can be implemented efficiently: their computational complexity is O(Mn) instead of O(n/sup M/) (as in the case of generic non-factorable filters). Unfortunately, the passband support of a factorable filter can assume only very simple shapes (parallelepipeds with edges pairwise parallel to the axes), which are not adequate for most applications. In a recent paper, Chen and Vaidyanathan (1991, 1993) proposed a new class of non-factorable M-dimensional filters, whose passband support can be any parallelepiped, which can be realized with complexity O(Mn). In addition, they are designed starting from 1-D prototypes, which makes for a very simple design procedure. In this paper, we show that such filters belong to the class of generalized factorable (GF) filters (whose formal definition we introduce here), and derive some properties of theirs relative to the 2-D case. Our review includes issues such as the relation between minimax frequency response parameters and filter size (which is nontrivial in the multidimensional case), symmetries, 2-D step response, and frequency response constraints.
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机译:可分解的M维滤波器之所以有趣,是因为它们可以有效地实现:它们的计算复杂度是O(Mn)而不是O(n / sup M /)(在通用的非因数滤波器的情况下)。不幸的是,可分解滤波器的通带支持只能采用非常简单的形状(平行六面体的边缘成对平行于轴),这对于大多数应用来说并不足够。 Chen和Vaidyanathan(1991,1993)在最近的一篇论文中提出了一类新的不可分解的M维滤波器,其通带支持可以是任何平行六面体,可以用复杂度O(Mn)实现。此外,它们是从1-D原型开始设计的,这使得设计过程非常简单。在本文中,我们证明了此类滤波器属于广义因式(GF)滤波器的类别(在此引入其形式定义),并推导了它们相对于2D情况的一些属性。我们的综述包括诸如最小最大频率响应参数与滤波器尺寸之间的关系(在多维情况下不平凡),对称性,二维阶跃响应和频率响应约束等问题。
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