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    李松, 张丽平, 郝晓红, 郝忠孝. Vague区域关系与方向关系的表示及复合推理[J]. 计算机研究与发展, 2015, 52(4): 918-928. DOI: 10.7544/issn1000-1239.2015.20131352
    引用本文: 李松, 张丽平, 郝晓红, 郝忠孝. Vague区域关系与方向关系的表示及复合推理[J]. 计算机研究与发展, 2015, 52(4): 918-928. DOI: 10.7544/issn1000-1239.2015.20131352
    Li Song, Zhang Liping, Hao Xiaohong, Hao Zhongxiao. Representation and Compound Reasoning of Vague Region Relations and Direction Relations[J]. Journal of Computer Research and Development, 2015, 52(4): 918-928. DOI: 10.7544/issn1000-1239.2015.20131352
    Citation: Li Song, Zhang Liping, Hao Xiaohong, Hao Zhongxiao. Representation and Compound Reasoning of Vague Region Relations and Direction Relations[J]. Journal of Computer Research and Development, 2015, 52(4): 918-928. DOI: 10.7544/issn1000-1239.2015.20131352

    Vague区域关系与方向关系的表示及复合推理

    Representation and Compound Reasoning of Vague Region Relations and Direction Relations

    • 摘要: Vague区域关系和Vague方向关系的表示和推理在空间数据库、网络信息安全、数据挖掘和人工智能等领域具有重要的意义. 为了处理复杂的Vague区域关系和Vague方向关系表示及其复合推理等问题,基于Vague集对Vague区域关系和方向关系进行了系统研究. 给出了Vague区域关系交集矩阵和表示模型;为了处理由参照对象的不确定性所导致的方向关系的不确定性,基于Vague集提出了Vague方向关系的交集矩阵表示方法;为了对动态Vague方向关系进行分析、预测与推理,详细研究了Vague方向关系的动态性和动态邻接关系,给出了Vague方向关系的反向方向关系处理方法;进一步研究了Vague区域关系和Vague方向关系的复合关联推理方法. 理论研究和实验分析表明研究成果可较好地处理Vague区域关系和Vague方向关系及其复合关联推理等问题,增强了数据信息处理系统对复杂不确定空间关系的处理能力.

       

      Abstract: Representation and reasoning of Vague region relations and direction relations have important significance in spatial database, network information security, data mining and artificial intelligence, etc. To deal with the complex representations and the compound reasoning of Vague region relations and direction relations, Vague region relations and direction relations are systematically analyzed based on the Vague sets which can deal with a great deal of uncertainty information. Based on the Vague sets, the intersection matrices and the representation model of the Vague regions are given. To handle the uncertainty of the direction relations caused by the ambiguity of Vague regions, Vague direction points and Vague direction space are defined based on the Vague sets and the intersection matrices of the direction relations are studied. To analyze and reason the dynamic Vague direction relations, the dynamic adjacency table of the Vague direction space are given. Furthermore, the methods for the reverse direction relations and the related reasoning of the Vague region relations and the Vague direction relations are studied also. The theoretical research and the experimental analysis show that the production in this work can deal with the key problems of the Vague region relations and the Vague direction relations and it can handle the complex reasoning.

       

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