多年来,有限环上的循环码和自对偶码一直是编码研究者所关心的热点问题。
In the last ten or more years, the cyclic codes and self-dual codes over finite rings have become a hot issue for coding theorists.
小波分解形成了图像能量的聚集,这种聚集可以形成更多的零树,而MSR作为对对偶小波波形集中度的度量参数,同样也可以作为衡量零树编码效率的度量。
Wavelet decompose can made the energy of image get together to the low frequency, thus it can form more zero-trees and MSR as the measure of the efficiency of zero-trees coding.
在我们的应用中,我们提出了一种全新的编码方式采样编码,以及与该编码对应的动态双点交叉算子和对偶变异算子。
In ours application, we proposed a novel encoding method: Sample Code, as well as Dynamic Two-Point Crossover Operator and Dual Simple Mutation Operator.
基于数学形态学的对偶法则以及数学形态学理论与线性位移不变系统理论间的关系,引入了偏振编码技术,提出使击中与否运算通过单通道取零阈值非相干光学相关器来实现的方案。
With polarization encoding, the scheme combines the foreground and background of an image into an encoded image, so the hit-miss transform can be completed by an erosion operator, one-channel re.
多年来,有限环上的循环码和自对偶码一直是编码研究者所关心的热点问题。
The equivalence of maximal self-orthogonal codes obtained from binary self-dual codes by truncating are discussed.
多年来,有限环上的循环码和自对偶码一直是编码研究者所关心的热点问题。
The equivalence of maximal self-orthogonal codes obtained from binary self-dual codes by truncating are discussed.
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