基于分形理论的城市群最优空间结构模型与应用被引量：10

An Optimal Spatial Structure Model of Urban Agglomeration and Its Application Based on Fractal Theory

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摘要利用分形维数将城市群空间结构特征与城市群整体收益损耗联系起来,建立包含投入、产出和人口规模等多因素空间分布分形特征的城市群最优空间结构模型,明确城市群最优空间结构的经济内涵,为城市群空间结构优化提供理论支撑。以陕西省关中城市群为例,在利用城市规模效益对比检验模型有效性的基础上,对比最优分形维数与Zipf维数演变趋势,发现模型预测的空间结构优化方向与城市群空间结构Zipf维数等于1的优化标准并不相悖。 The fractal dimension is used to connect the spatial structure features of urban agglomeration with the incomes and losses of urban agglomeration to establish the optimal spatial structure model of urban agglomeration characterized by multi-element spatial distribution including the inputs outputs and population scales,etc.So as to make clear the economic connotations of the optimal spatial structure model of urban agglomeration.With Guanzhong urban agglomeration in Shaanxi as the example,the contrast is made between the optimal fractal dimension and Zipf fractal dimension evolution trend on the basis of using the urban scale benefit comparison check model effectiveness.It has been found that the spatial structure optimization direction predicted by the model is in agreement with the optimization norms of Zipf dimension being equal to 1 of the spatial structure of urban agglomeration.

作者赵璟党兴华

机构地区西安理工大学经济与管理学院

出处《西安理工大学学报》 CAS 北大核心 2012年第2期240-246,共7页 Journal of Xi'an University of Technology

基金教育部人文社会科学基金资助项目(09YJCZH097) 陕西省自然科学基金资助项目(2011JQ9002) 陕西省软科学研究计划重点基金资助项目(2011KRZ05) 陕西省教育厅科学研究基金资助项目(11JK0171) 西安社会科学规划基金资助项目(12J33) 西安理工大学教学改革基金资助项目(107-002J04)

关键词城市群最优空间结构模型分形维数关中 urban agglomeration optimal spatial structure model fractal dimension Guanzhong

分类号 F129 [经济管理—世界经济] F293 [经济管理—国民经济]

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