共查询到18条相似文献,搜索用时 796 毫秒
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《测绘科学技术学报》2020,(1)
复合表达模型结合了锥形模型与方向关系矩阵模型的优点,较好地顾及了目标的形状、大小和距离对方向关系的影响,但该模型仅能对两目标之间的方向关系进行定性描述,对于两目标间的方向关系相似性尚未进行研究。本文在对复合表达模型的方向关系矩阵进行优化的基础上,建立一种基于复合表达模型的面目标方向关系相似性计算模型,将该模型的相似值计算转化为交通运输最小代价问题求解。通过认知实验验证了算法的科学性,同时比较实验说明该算法精确度更高。 相似文献
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针对计算空间场景相似性的TDD(Topology-Direction-Distance)模型的局限,提出一种基于改进的TDD模型来度量实体数目相同的场景相似度的算法.该算法以TDD模型的思想为核心,首先利用维度扩展的9交模型、详细方向关系矩阵模型和距离定量描述方法分别提取空间场景中的实体间拓扑、方向和距离特征,建立空间场景特征矩阵,实现对空间场景的表达;然后结合拓扑、方向关系的概念邻域方法和欧式距离,构建针对矢量面数据空间场景相似性度量模型;利用场景相似性度量模型进行空间场景相似性匹配;最后以深圳市福田区矢量面数据为例进行实验.实验结果表明该方法能有效度量空间场景的相似度. 相似文献
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利用质心作为参考点,并在空间方向锥形模型中添加了扩展不确定度的参数,用区间分析法,对多尺度下顾及不确定性的空间方向关系进行形式化描述,来适应尺度变化引起的空间关系不确定性的变化,以更好地描述空间方向关系。该模型使得方向关系的划分上有个平滑的过渡区,在方向概念的表达上更符合人的认知。 相似文献
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基于自适应采样粒度模型的空间方向关系模糊描述方法 总被引:1,自引:0,他引:1
针对空间方向关系具有不确定性的特点以及现有的方向关系表达方法的局限性,结合模糊理论分析方向隶属函数的基本特征,建立基于非线性隶属函数的8方向模糊描述参考框架。分析空间目标间的距离、尺寸、形状等因素对方向关系的影响,提出空间目标的自适应采样粒度模型。在保证空间方向关系一致性的前提下,对空间对象进行采样处理生成合适大小的点集。在8方向模糊描述参考框架下,统计点集之间的8个方向模糊矩阵,得到空间对象之间在各方向概念上的隶属程度,实现空间方向关系的细节模糊描述。通过实例分析验证该模糊描述方法的可行性和有效性。 相似文献
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空间方向关系作为空间关系的一个重要分支,其相似性研究已成为地理信息科学领域的热点问题。对于Goyal提出的基于方向关系矩阵计算空间方向相似性模型进行以下两个方面改进:首先通过方向关系的反转运算计算对象目标与参考目标的最小投影矩阵在包含或相交情况下的空间方向关系,扩展了方向关系矩阵的使用范围;其次利用运筹学中解决平衡运输问题的伏格尔法计算两个多元素方向关系矩阵之间的方向距离,克服了由平衡运输表中元素位置变化而引起方向距离变化的局限。通过实例证明该方法计算简单,得到的方向距离更优,相似性更加准确。 相似文献
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锥形空间方向关系模型的改进 总被引:1,自引:0,他引:1
提出了一种融入方向关系矩阵模型思想的改进型锥形模型。该模型同时具备了两者的优点,尤其对多尺度空间目标的空间方位关系的表达比较有效.并顾及到了多尺度的包容性。 相似文献
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通过对各种空间方向关系形式化描述模型进行分析阐述,针对面状群(组)目标间方向关系的特点,本文提出了利用方向Voronoi图模型来计算面状群(组)目标之间的空间方向关系.该模型通过计算获得各个主方向上Voronoi边的长度值与方向Voronoi边法线总长度值的百分比,得到群(组)目标之间方向关系的定量表达;借助矩阵形式化描述获得源目标群相对于参考目标群方向关系的定性描述.实验表明,该模型方案具有可行性,能够对面状群(组)目标间的方向关系进行精确的描述. 相似文献
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Qualitative representation of spatial locations and their similarity measurements are essential for the analysis of linguistic term‐based data. Existing methods have focused on the similarities of spatial relations and spatial scenes but have not considered the variations in geometrical representations and relations over scales. This study developed some new measures to assess the similarities of both single‐ and multi‐scale qualitative locations. Region‐ and cell‐based models were used to formalize qualitative locations of spatial objects with respect to multi‐scale frames of reference. The similarities were assessed by integrating the similarities of frames and qualitative relations. The frame similarity measures how two objects are compared considering the common elements that they occupy in the reference frames. Moreover, the similarity of qualitative relation measures how two relations relate two objects to the corresponding elements in the frames. The location similarities at a single level integrate the similarities of the frames and qualitative relations, whereas the location similarities at multiple scales incorporate the variations in qualitative locations over scales. These methods were used to assess location similarities concerning residential areas, roads, and lakes. The results indicated that the location‐based measurements can disclose the distributions of the similarities and that the cell‐based model is more accurate than the region‐based model. 相似文献
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矢量GIS空间方向关系的演算模型 总被引:5,自引:0,他引:5
空间方向关系是描述空间目标间位置分布的一类基本空间约束,在GIS中是由形式化模型描述的。但现有模型由于简化假设过多,其描述分辨率较低。以点/点空间方向关系的计算量为基础,在综合考虑空间目标的几何构成和分布关系后,提出了定量化演算空间方向关系的一种新模型。利用该模型的结果,根据定量表达与定性描述之间的转换函数,可以得到相应的定性描述结果。理论分析和算例表明,新模型对目标间距离和目标本身的形状等影响方向关系的参数更为敏感,因而比现有模型有更高的描述分辨率。 相似文献
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Quantitative relations between spatial similarity degree and map scale change of individual linear objects in multi-scale map spaces 总被引:1,自引:0,他引:1
Haowen Yan 《国际地球制图》2015,30(4):472-482
Quantitative relations between spatial similarity degree and map scale change in multi-scale map spaces play important roles in map generalization and construction of spatial data infrastructure. Nevertheless, no achievements have been made regarding this issue. To fill the gap, this paper firstly proposes a model for calculating spatial similarity degrees between an individual linear object at one scale and its generalized counterpart at the other scale. Then psychological experiments are designed to validate the new model, taking four different individual linear objects at five different scales as test samples. The experiments have shown that spatial similarity degrees calculated by the new model can be accepted by a majority of the subjects. After this, it constructs a formula that can calculate spatial similarity degree using map scale change (and vice versa) for individual linear objects in multi-scale map spaces by the curve fitting method using the point data from the psychological experiments. Both the formula and the model can calculate quantitative relations between spatial similarity degree and map scale change of individual linear objects in multi-scale map spaces, which facilitates automation of map generalization algorithms for linear features. 相似文献
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提出了基于栅格数据的面状目标之间的两种空间方向相似性的计算方法:利用栅格数据的特征和方向关系矩阵计算空间方向相似性;基于单个栅格单元与参考目标之间角度的变化计算面状目标之间空间方向相似性。这两种方法简化了由Goyal提出的基于方向关系矩阵模型计算空间方向相似性的方法,克服了方向产生某些细微变化时的限制,在计算面状目标空间方向相似性时具有更广泛的适用性。 相似文献
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DINGHong GUOQingsheng DUXiaochu 《地球空间信息科学学报》2004,7(3):225-230
Similarity for spatial directions plays an important role in GIS. In this paper, the conventional approaches are analyzed. Based on raster data areal objects, the authors propose two new methods for measuring similarity among spatial directions. One is to measure the similarity among spatial directions based on the features of raster data and the changes of distances between spatial objects, the other is to measure the similarity among spatial directions according to the variation of each raster cell centroid angle. The two methods overcome the complexity of measuring similarity among spatial directions with direction matrix model and solve the limitation of small changes in direction. The two methods are simple and have broader applicability. 相似文献
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Similarity for spatial directions plays an important role in GIS. In this paper, the conventional approaches are analyzed. Based on raster data areal objects, the authors propose two new methods for measuring similarity among spatial directions. One is to measure the similarity among spatial directions based on the features of raster data and the changes of distances between spatial objects, the other is to measure the similarity among spatial directions according to the variation of each raster cell centroid angle. The two methods overcome the complexity of measuring similarity among spatial directions with direction matrix model and solve the limitation of small changes in direction. The two methods are simple and have broader applicability. 相似文献
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Qualitative locations describe spatial objects by relating the spatial objects to a frame of reference (e.g. a regional partition in this study) with qualitative relations. Existing models only formalize spatial objects, frames of reference, and their relations at one scale, thus limiting their applicability in representing location changes of spatial objects across scales. A topology‐based, multi‐scale qualitative location model is proposed to represent the associations of multiple representations of the same objects with respect to the frames of reference at different levels. Multi‐scale regional partitions are first presented to be the frames of reference at multiple levels of scale. Multi‐scale locations are then formalized to relate multiple representations of the same objects to the multiple frames of reference by topological relations. Since spatial objects, frames of reference, and topological relations in qualitative locations are scale dependent, scale transformation approaches are presented to derive possible coarse locations from detailed locations by incorporating polygon merging, polygon‐to‐line and polygon‐to‐point operators. 相似文献