A multi-fractal framework of urban hierarchies is presented to address the rank-size distribution of cities. The three-parameter Zipf model based on a pair of exponential-type scaling laws is generalized to multi-scale fractal measures. Then according to the equivalent relationship between Zipf's law and Pareto distribution, a set of multi-fractal equations are derived using dual conversion and the Legendre transform. The US city population data coming from the 2000 census are employed to verify the multi-fractal models and the results are satisfying. The multi-fractal measures reveal some strange symmetry regularity of urban systems. While explaining partially the remains of the hierarchical step-like frequency distribution of city si...
Urban form takes on properties similar to random growing fractals and can be described in terms of f...
Descriptions of central place hierarchies proposed by W. Christaller are abstracted mathematically a...
Zipf’s law is one of the main features in regional sciences, when it comes in studying urban systems...
Zipf's law is one the most conspicuous empirical facts for cities, however, there is no convinc...
This paper contributes to the demonstration that the self-similar city hierarchies with cascade stru...
Fractals, 1/f noise, and Zipf's laws are frequently observed within the natural living world as...
Zipf's law of city-size distributions can be expressed by three types of mathematical models: o...
International audienceFractal analysis for exploring the spatial organization of settlement patterns...
Urban population density always follows the exponential distribution and can be described with Clark...
The empirical studies of city-size distribution show that Zipfs law and the hierarchical scaling law...
Urban form has been empirically demonstrated to be of scaling invariance and can be described with f...
Hierarchy of cities reflects the ubiquitous structure frequently observed in the natural world and s...
Central place systems have been demonstrated to possess self-similarity in both the theoretical and ...
Hierarchy of cities reflects the ubiquitous structure frequently observed in the natural world and s...
The study is made of the spatial structure of the systems of cities and towns in Central Plains, mai...
Urban form takes on properties similar to random growing fractals and can be described in terms of f...
Descriptions of central place hierarchies proposed by W. Christaller are abstracted mathematically a...
Zipf’s law is one of the main features in regional sciences, when it comes in studying urban systems...
Zipf's law is one the most conspicuous empirical facts for cities, however, there is no convinc...
This paper contributes to the demonstration that the self-similar city hierarchies with cascade stru...
Fractals, 1/f noise, and Zipf's laws are frequently observed within the natural living world as...
Zipf's law of city-size distributions can be expressed by three types of mathematical models: o...
International audienceFractal analysis for exploring the spatial organization of settlement patterns...
Urban population density always follows the exponential distribution and can be described with Clark...
The empirical studies of city-size distribution show that Zipfs law and the hierarchical scaling law...
Urban form has been empirically demonstrated to be of scaling invariance and can be described with f...
Hierarchy of cities reflects the ubiquitous structure frequently observed in the natural world and s...
Central place systems have been demonstrated to possess self-similarity in both the theoretical and ...
Hierarchy of cities reflects the ubiquitous structure frequently observed in the natural world and s...
The study is made of the spatial structure of the systems of cities and towns in Central Plains, mai...
Urban form takes on properties similar to random growing fractals and can be described in terms of f...
Descriptions of central place hierarchies proposed by W. Christaller are abstracted mathematically a...
Zipf’s law is one of the main features in regional sciences, when it comes in studying urban systems...