基于代数粒的聚类方法

计算机工程与科学 ›› 2024, Vol. 46 ›› Issue (01): 150-158.

基于代数粒的聚类方法

肖振国1，陈林书1，孙少杰1，梅本霞1，柳媛慧2，赵磊3

（1.湖南科技大学计算机科学与工程学院，湖南湘潭 411201；2.湖南科技大学外国语学院，湖南湘潭 411201;
3.湖南警察学院信息技术（网监）系，湖南长沙 410138）

收稿日期:2022-05-17 修回日期:2022-08-13 接受日期:2024-01-25 出版日期:2024-01-25 发布日期:2024-01-15
基金资助:
湖南省教育厅科学研究项目（21C0946）;湖南省教育厅教学改革研究项目(HNJG-2022-0786,HNJG-2022-0792);湖南科技大学教学改革研究项目(2021-76-9,2021-76-26)

A clustering method based on algebraic granularity

（1.School of Computer Science and Engineering,Hunan University of Science and Technology,Xiangtan 411201；
2.School of Foreign Languages,Hunan University of Science and Technology,Xiangtan 411201;
3.Department of Information Technology（Network Supervision）,Hunan Police College,Changsha 410138,China）

Received:2022-05-17 Revised:2022-08-13 Accepted:2024-01-25 Online:2024-01-25 Published:2024-01-15

摘要/Abstract

摘要： 聚类，是机器学习的主要任务之一，也是粒计算理论的核心任务，即信息粒化。目前，基于粒计算的聚类算法中，大多数只基于粒属性进行聚类，而没有考虑粒结构，尤其是在代数结构应用广泛的信息领域。从粒计算的角度，提出一种基于代数粒的聚类方法。基于二元代数运算定义代数粒；提出一种基于代数粒的聚类方法，通过粒集的同余划分和粒结构的同态映射进行粒度聚类；将提出的聚类方法与容差邻域模型和商空间模型进行对比分析。结果表明，该新型方法具有更好的结构完备性和应用鲁棒性。基于代数粒的聚类方法从结构上丰富和扩展了粒度计算理论，为粒计算与机器学习的融合研究提供了理论依据。

关键词: 粒计算, 聚类, 粒化, 粗糙集, 商空间模型

Abstract: Clustering is the main task of machine learning, and is also the core work of granular computing, namely information granulation. At present, most of granular computing based clustering algorithms only utilize the granule features without taking the granule structure into account, especially in the information field where algebraic structure is widely used. From the perspective of granular computing, this paper proposes a clustering method based on algebraic granularity (CMAG). Firstly, the algebraic granularity is newly formulated with the granule structure of an algebraic binary operator. Se- condly, the CMAG is proposed with granules of incorporating congruence partition and granule structure of homeomorphic projection. Finally, the CMAG is experimentally compared with the tolerance domain model and the quotient space model, and the results show that the CMAG has better structural completeness and practical robustness. The CMAG can enrich and extend the granular computing theory from granule structure, and will provide a theoretical basis for the combination of granular computing methods and machine learning theory.

Key words: granular computing, clustering, granulation, rough set, quotient space model

肖振国, 陈林书, 孙少杰, 梅本霞, 柳媛慧, 赵磊. 基于代数粒的聚类方法[J]. 计算机工程与科学, 2024, 46(01): 150-158.

XIAO Zhen-guo, CHEN Lin-shu, SUN Shao-jie, MEI Ben-xia, LIU Yuan-hui, ZHAO Lei. A clustering method based on algebraic granularity[J]. Computer Engineering & Science, 2024, 46(01): 150-158.

参考文献［23］

［1］	Lin T Y.Granular computing:Fuzzy logic and rough sets［M］∥Computing with Words in Information/Intelligent Systems 1.Zadeh L A,Kacprzyk J, Translation. Berlin:Springer,1999.
［2］	Chen L S, Shen F H, Tang Y F, et al. Algebraic structure based clustering method from granular computing prospective［J］. International Journal of Uncertainty Fuzziness and Knowledge-based Systems, 2023,31(1):121-140.
［3］	Guha S,Rastogi R,Shim K.CURE:An efficient clustering algorithm for large databases［J］.Information Systems,2001,26(1):35-58.
［4］	Lin T Y.Neighborhood system and approximation in relational databases and knowledge bases［C］∥Proc of the 4th International Symposium on Methodologies of Intelligent Systems,1988:75-86.
［5］	Yao Y Y.Relational interpretations of neighborhood operators and rough set approximation operators［J］.Information Sciences,1998,111(1-4):239-259.
［6］	Lin T Y.Granular computing:From rough sets and neighborhood systems to information granulation and computing in words［C］∥Proc of the European Congress on Intelligent Techniques and Soft Computing,1997:1-6.
［7］	Yao Y Y. Rough sets,neighborhood systems and granular computing［C］∥Proc of the IEEE Canadian Conference on Electrical and Computer Engineering,1999:1553-1558.
［8］	Zhang B,Zhang L.Theory and applications of problem solv- ing［M］.Amsterdam:North Holland Publishing,2005.
［9］	张铃，张钹.问题求解理论及应用——商空间粒度计算理论及应用［M］.第2版.北京:清华大学出版社,2007.
［10］	Chen L S,Wang J Y,Li L.A new granular computing model based on algebraic structure ［J］. Chinese Journal of Electronics,2019,28(1):136-142.
［11］	Chen L S,Wang J Y,Li L.The models of granular system and algebraic quotient space in granular computing［J］. Chinese Journal of Electronics,2016,25(6):1109-1113.
［12］	陈林书,王加阳,杨正华,等.基于代数结构的商空间模型研究［J］.电子学报,2016,44(4):952-958.
	Chen Lin-shu,Wang Jia-yang,Yang Zheng-hua.A study for quotient space model based on algebraic structure［J］.Acta Electronica Sinica,2016,44(4):952-958.
［13］	Chen L S,Zhao L,Xiao Z G,et al.A granular computing based classification method from algebraic granule structure［J］.IEEE Access,2021,9:68118-68126.
［14］	Chen L S,Liu Y H,Wang J Y,et al.The re-granulation on topological structure of granular computing［C］∥Proc of the 2019 International Conference on Artificial Intelligence and Computer Science,2019:106-110.
［15］	Chen L S,Wang J Y.The rough representation and mea- surement of quotient structure in algebraic quotient space model ［J］.High Technology Letters,2017,23(3):293-297.
［16］	陈丽芳,代琪,赵佳亮.不平衡数据多粒度集成分类算法研究［J］.计算机工程与科学,2021,43(5):917-925.
	Chen Li-fang,Dai Qi,Zhao Jia-liang.A multi-granularity ensemble classification algorithm for imbalanced data［J］.Computer Engineering & Science,2021,43(5):917-925.
［17］	王磊，叶军.知识粒度计算的矩阵方法及其在属性约简中的应用［J］.计算机工程与科学,2013,35(3):97-102.
	Wang Lei, Ye Jun. Matrix-based approach for calculating knowledge granulation and its application in attribute reduction［J］.Computer Engineering & Science,2013,35(3):97-102.
［18］	骆公志,陈佳馨.多源覆盖信息系统下的加权广义多粒度粗糙集模型及其应用［J］.计算机工程与科学,2021,43(12):2231-2237.
	Luo Gong-zhi,Chen Jia-xin.A weighted generalized multi-granulation rough set model of multi-source covering information system and its applications［J］.Computer Engineering & Science,2021,43(12):2231-2237.
［19］	Khrissi L,Akkad N E,Satori H, et al.Clustering method and sine cosine algorithm for image segmentation［J］.Evolutionary Intelligence,2021(1):1-14.
［20］	Ansari T, Siddiqui A, Awasthi G K. Clustering analysis using an unsupervised machine learning method［J］. International Journal of Scientific Research in Computer Science Engineering and Information Technology,2021,7(3):602-609.
［21］	Cao B Q,Liu X Q,Rahman M D,et al.Integrated content and network-based service clustering and web APIs recommendation for Mashup development［J］.IEEE Transactions on Services Computing,2017,13(1):99-113.
［22］	Wang Y X,Zadeh L A,Yao Y Y.On the system algebra foundations for granular computing［J］.International Journal of Software Science & Computational Intelligence,2009,1(1):64-86.
［23］	Wang Y X.Granular algebra for modeling granular systems and granular computing［C］∥Proc of the 8th IEEE International Conference on Cognitive Informatics,2009:145-154.

[1]	王若宾, 耿芳东, 张永梅, 宋威, 王伟锋, 徐琳. 基于改进自适应DBSCAN的混合式MOOC视频观看模式挖掘[J]. 计算机工程与科学, 2023, 45(09): 1670-1678.
[2]	李帅, 常锦才, 李吕牧之, 蔡昆杰, . 基于差分隐私保护的Stacking集成聚类算法研究[J]. 计算机工程与科学, 2022, 44(08): 1402-1408.
[3]	李兰, 刘杰, 张洁. 基于YOLOv4改进算法的复杂行人检测模型研究[J]. 计算机工程与科学, 2022, 44(08): 1449-1456.
[4]	陈奉贤. 基于NR-Transformer的集群作业运行时间预测[J]. 计算机工程与科学, 2022, 44(07): 1181-1190.
[5]	庞兴龙, 朱国胜, 杨少龙, 李修远. 一种基于聚类与噪声的网络流量分类方法[J]. 计算机工程与科学, 2022, 44(07): 1207-1215.
[6]	黄志强, 李军, 张世义. 基于轻量级神经网络的目标检测研究[J]. 计算机工程与科学, 2022, 44(07): 1265-1272.
[7]	刘榕, 伍欣, 敖斌, 文青, 李宽. 用于CD56图像分割的细胞标注精细化与自适应加权损失[J]. 计算机工程与科学, 2022, 44(05): 870-878.
[8]	刘云, 肖添, 王梓宇. 动态特征选择算法对恶意行为检测的优化研究[J]. 计算机工程与科学, 2022, 44(04): 665-673.
[9]	袁泉, 晏飞扬, 文志云, 张振康, . 基于谱聚类的社交网络差分隐私保护算法研究[J]. 计算机工程与科学, 2022, 44(02): 251-256.
[10]	许光宇, 丁健. 基于特征聚类的大视差图像拼接算法 [J]. 计算机工程与科学, 2022, 44(02): 283-290.
[11]	沈郭鑫, 蒋中云. 基于密度和中心指标的Canopy二分K-均值算法优化[J]. 计算机工程与科学, 2022, 44(02): 372-380.
[12]	颜廷龙, 李瑛, 王凤芹. 基于MRF模型的飞机飞行动作识别划分算法[J]. 计算机工程与科学, 2022, 44(01): 159-164.
[13]	骆公志, 陈佳馨. 多源覆盖信息系统下的加权广义多粒度粗糙集模型及其应用[J]. 计算机工程与科学, 2021, 43(12): 2231-2237.
[14]	苏小会, 张玉西, 徐淑萍, 尚煜. 改进K-means聚类算法行驶工况及油耗研究[J]. 计算机工程与科学, 2021, 43(11): 2020-2026.
[15]	李雨晨, 魏巍, 白伟明, 王达. 基于标签共现关系的多标签特征选择[J]. 计算机工程与科学, 2021, 43(11): 2049-2055.