Add to ORKGThe widely-used Zipf’s law has two striking regularities. One is its excellent fit; the other is its close-to-one exponent. When the exponent equals to one, the Zipf’s law collapses into the rank-size rule. This paper further analyzes the Zipf exponent. By changing the sample size, the truncation point, and the mix of cities in the sample, we found that the exponent is close to one only for some selected sub-samples. Small samples of large cities alone provide higher value of the exponent whereas small cities introduce high variance and lower the value of the exponent. Using the values of estimated exponent from the rolling sample method, we obtained an elasticity of the exponent with respect to sample size. We concluded that the rank-size ...
The largest cities, the most frequently used words, the income of the richest countries, and the mos...
First Online: 30 Jan 2017In this paper we study Zipf's law, which postulates that the product of a c...
This paper proposes a new explanation for Zipf’s law often observed in the top tail of city size dis...
ABSTRACT: Zipf's law has two striking regularities: excellent fit and an exponent close to 1.0. When...
The widely-used Zipf law has two striking regularities: excellent fit and close-to-one exponent. Whe...
Existing explanations of Zipf's law (Pareto exponent approximately equal to 1) in size distributions...
In this paper, I provide a quantitative review of the empirical literature on Zipf's law for cities;...
We use data for metro areas in the United States, from the US Census for 1900 û 1990, to test the va...
This study provides a systematic review of the existing literature on Zipf’s law for city size distr...
The rank-size rule and Zipf's law for city sizes have been traditionally examined by means of OLS es...
In the last years, researchers have realized the difficulties of fitting power-law distributions pro...
In this short paper we apply the methodology proposed by Ioannides and Overman (2003) to estimate a ...
P(論文)We may generally define the rank-size rule by the formula : FR_=f(R) where F_R is the frequency...
This work presents a simple method for calculating deviations regarding city size and the size which...
We offer a general-equilibrium economic approach to Zip's Law or, more generally, the rank-size dist...
The largest cities, the most frequently used words, the income of the richest countries, and the mos...
First Online: 30 Jan 2017In this paper we study Zipf's law, which postulates that the product of a c...
This paper proposes a new explanation for Zipf’s law often observed in the top tail of city size dis...
ABSTRACT: Zipf's law has two striking regularities: excellent fit and an exponent close to 1.0. When...
The widely-used Zipf law has two striking regularities: excellent fit and close-to-one exponent. Whe...
Existing explanations of Zipf's law (Pareto exponent approximately equal to 1) in size distributions...
In this paper, I provide a quantitative review of the empirical literature on Zipf's law for cities;...
We use data for metro areas in the United States, from the US Census for 1900 û 1990, to test the va...
This study provides a systematic review of the existing literature on Zipf’s law for city size distr...
The rank-size rule and Zipf's law for city sizes have been traditionally examined by means of OLS es...
In the last years, researchers have realized the difficulties of fitting power-law distributions pro...
In this short paper we apply the methodology proposed by Ioannides and Overman (2003) to estimate a ...
P(論文)We may generally define the rank-size rule by the formula : FR_=f(R) where F_R is the frequency...
This work presents a simple method for calculating deviations regarding city size and the size which...
We offer a general-equilibrium economic approach to Zip's Law or, more generally, the rank-size dist...
The largest cities, the most frequently used words, the income of the richest countries, and the mos...
First Online: 30 Jan 2017In this paper we study Zipf's law, which postulates that the product of a c...
This paper proposes a new explanation for Zipf’s law often observed in the top tail of city size dis...