Open AccessThe Price Dispersion of Consumer Products
Author(s) -
Joachim Kaldasch,
Antonios Koursovitis
Publication year - 2021
Publication title -
journal of economics and public finance
Language(s) - English
Resource type - Journals
eISSN - 2377-1046
pISSN - 2377-1038
DOI - 10.22158/jepf.v7n4p1
Subject(s) - price dispersion , laplace transform , dispersion (optics) , product (mathematics) , distribution (mathematics) , profit (economics) , dirac delta function , laplace distribution , econometrics , mathematics , economics , physics , microeconomics , mathematical analysis , quantum mechanics , geometry
Presented is an analytic dynamic model of the price dispersion of consumer products. The theory is based on the idea that sellers offer product units for a profit maximizing price, denoted pm. Product units not sold at pm are called excess units. Based on the conservation equation of offered units, it can be shown that the stationary price distribution of consumer products consists of a Dirac-delta peak at pm surrounded by a fat-tailed Laplace distribution from the excess units. A good quantitative agreement with empirical data can be obtained with a fit of the two free parameters of the theory.