排序方式: 共有55条查询结果,搜索用时 7 毫秒
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针对传统态势评估方法确定权值的主观性强、处理大数据能力弱、特征提取能力不足等问题,提出基于改进变分自编码器和聚类算法的无监督空战态势评估方法。根据态势变化连续性特点,提出基于时间段的空战态势分类方法,将敌我双方态势划分为四类。在变分自编码器的基础上,提出了VAE-WRBM-MDN特征提取模型,即使用混合密度网络优化变分自编码器的特征提取能力和生成数据的相似度,使用权值不确定限制玻尔兹曼机优化网络的初始权值。将提取的特征分别输入到两种典型的聚类算法中进行聚类,并结合态势函数和实际战场情况修正聚类结果,形成正确的态势分类标准。在实验部分,分别进行了最优参数调整、关键特征提取、聚类以及修正实验。实验结果表明,模型态势分类正确率和运行时间均满足应用需求,实例评估结果与客观态势一致性强,所提方法具有实际应用价值。 相似文献
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《防务技术》2020,16(1):208-216
As the generalization of intuitionistic fuzzy set (IFS) and Pythagorean fuzzy set (PFS), the q-rung orthopair fuzzy set (q-ROFS) has emerged as a more meaningful and effective tool to solve multiple attribute group decision making (MAGDM) problems in management and scientific domains. The MABAC (multi-attributive border approximation area comparison) model, which handles the complex and uncertain decision making issues by computing the distance between each alternative and the bored approximation area (BAA), has been investigated by an increasing number of researchers more recent years. In our article, consider the conventional MABAC model and some fundamental theories of q-rung orthopair fuzzy set (q-ROFS), we shall introduce the q-rung orthopair fuzzy MABAC model to solve MADM problems. at first, we briefly review some basic theories related to q-ROFS and conventional MABAC model. Furthermore, the q-rung orthopair fuzzy MABAC model is built and the decision making steps are described. In the end, An actual MADM application has been given to testify this new model and some comparisons between this novel MABAC model and two q-ROFNs aggregation operators are provided to further demonstrate the merits of the q-rung orthopair fuzzy MABAC model. 相似文献
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基于星载干涉仪测向的辐射源定位综合算法 总被引:1,自引:1,他引:0
针对卫星多次观测定位点的估计问题,提出一种不依赖于先验知识的定位点综合算法.该算法首先分析了星载干涉仪测向体制的定位精度,并基于此提出利用定位误差协方差矩阵对定位点进行加权综合的方法.仿真实验表明本文方法可以提高定位精度. 相似文献
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《防务技术》2020,16(4):910-921
Non-cylindrical casings filled with explosives have undergone rapid development in warhead design and explosion control. The fragment spatial distribution of prismatic casings is more complex than that of traditional cylindrical casings. In this study, numerical and experimental investigations into the fragment spatial distribution of a prismatic casing were conducted. A new numerical method, which adds the Lagrangian marker points to the Eulerian grid, was proposed to track the multi-material interfaces and material dynamic fractures. Physical quantity mappings between the Lagrangian marker points and Eulerian grid were achieved by their topological relationship. Thereafter, the fragment spatial distributions of the prismatic casing with different fragment sizes, fragment shapes, and casing geometries were obtained using the numerical method. Moreover, fragment spatial distribution experiments were conducted on the prismatic casing with different fragment sizes and shapes, and the experimental data were compared with the numerical results. The effects of the fragment and casing geometry on the fragment spatial distributions were determined by analyzing the numerical results and experimental data. Finally, a formula including the casing geometry parameters was fitted to predict the fragment spatial distribution of the prismatic casing under internal explosive loading. 相似文献