Add to ORKGExisting explanations of Zipf's law (Pareto exponent approximately equal to 1) in size distributions require strong assumptions on growth rates or the minimum size. I show that Zipf's law naturally arises in general equilibrium when individual units solve a homogeneous problem (e.g., homothetic preferences, constant-returns-to-scale technology), the units enter/exit the economy at a small constant rate, and at least one production factor is in limited supply. My model explains why Zipf's law is empirically observed in the size distributions of cities and firms, which consist of people, but not in other quantities such as wealth, income, or consumption, which all have Pareto exponents well above 1
The largest cities, the most frequently used words, the income of the richest countries, and the mos...
We use data for metro areas in the United States, from the US Census for 1900 û 1990, to test the va...
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...
The widely-used Zipf’s law has two striking regularities. One is its excellent fit; the other is its...
This work presents a simple method for calculating deviations regarding city size and the size which...
This study looks at power laws, specifically Zipf ’s law and Pareto distributions, previously used t...
International audienceZipf's law is one of the few quantitative reproducible regularities found in e...
Pareto and Zipf distributions have been used in the modeling of distinct phenomena, namely in biolog...
We offer a general-equilibrium economic approach to Zip's Law or, more generally, the rank-size dist...
This study looks at power laws, specifically Zipf ’s law and Pareto distributions, previously used t...
This master thesis contains three independent papers on the Zip's law for cities. In the first essay...
This paper proposes a new explanation for Zipf’s law often observed in the top tail of city size dis...
In this paper, I provide a quantitative review of the empirical literature on Zipf's law for cities;...
Several recent papers have sought to provide theoretical explanations for Zipf’s Law, which states t...
The largest cities, the most frequently used words, the income of the richest countries, and the mos...
We use data for metro areas in the United States, from the US Census for 1900 û 1990, to test the va...
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...
The widely-used Zipf’s law has two striking regularities. One is its excellent fit; the other is its...
This work presents a simple method for calculating deviations regarding city size and the size which...
This study looks at power laws, specifically Zipf ’s law and Pareto distributions, previously used t...
International audienceZipf's law is one of the few quantitative reproducible regularities found in e...
Pareto and Zipf distributions have been used in the modeling of distinct phenomena, namely in biolog...
We offer a general-equilibrium economic approach to Zip's Law or, more generally, the rank-size dist...
This study looks at power laws, specifically Zipf ’s law and Pareto distributions, previously used t...
This master thesis contains three independent papers on the Zip's law for cities. In the first essay...
This paper proposes a new explanation for Zipf’s law often observed in the top tail of city size dis...
In this paper, I provide a quantitative review of the empirical literature on Zipf's law for cities;...
Several recent papers have sought to provide theoretical explanations for Zipf’s Law, which states t...
The largest cities, the most frequently used words, the income of the richest countries, and the mos...
We use data for metro areas in the United States, from the US Census for 1900 û 1990, to test the va...
The widely-used Zipf law has two striking regularities: excellent fit and close-to-one exponent. Whe...