Surflets: a sparse representation for multidimensional functions containing smooth discontinuities

V. Chandrasekaran, M. Wakin, D. Baron, Richard Baraniuk
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引用次数: 33

Abstract

Discontinuities in data often provide vital information, and representing these discontinuities sparsely is an important goal for approximation and compression algorithms. Little work has been done on efficient representations for higher dimensional functions containing arbitrarily smooth discontinuities. We consider the N-dimensional Horizon class-N-dimensional functions containing a C/sup K/ smooth (N-1)-dimensional singularity separating two constant regions. We derive the optimal rate-distortion function for this class and introduce the multiscale surflet representation for sparse piecewise approximation of these functions. We propose a compression algorithm using surflets that achieves the optimal asymptotic rate-distortion performance for Horizon functions. This algorithm can be implemented using knowledge of only the N-dimensional function, without explicitly estimating the (N-1)-dimensional discontinuity.
曲面:包含光滑不连续的多维函数的稀疏表示
数据中的不连续点通常提供重要的信息,稀疏地表示这些不连续点是逼近和压缩算法的一个重要目标。关于包含任意光滑不连续的高维函数的有效表示的工作很少。考虑n维Horizon类n维函数,其中包含一个C/sup K/光滑(N-1)维奇点,奇点分离两个常数区域。我们推导了这类函数的最优率失真函数,并引入了这些函数的稀疏分段逼近的多尺度surflet表示。我们提出了一种使用曲面的压缩算法,该算法对地平线函数实现了最优的渐近率失真性能。该算法可以仅使用n维函数的知识来实现,而无需显式估计(N-1)维不连续。
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