Lotka's law

Lotka's law,[1] named after Alfred J. Lotka, is one of a variety of special applications of Zipf's law. It describes the frequency of publication by authors in any given field. It states that the number of authors making ${\displaystyle x}$ contributions in a given period is a fraction of the number making a single contribution, following the formula ${\displaystyle 1/x^{a}}$ where ${\displaystyle a}$ nearly always equals two, i.e., an approximate inverse-square law, where the number of authors publishing a certain number of articles is a fixed ratio to the number of authors publishing a single article. As the number of articles published increases, authors producing that many publications become less frequent. There are 1/4 as many authors publishing two articles within a specified time period as there are single-publication authors, 1/9 as many publishing three articles, 1/16 as many publishing four articles, etc. Though the law itself covers many disciplines, the actual ratios involved (as a function of 'a') are discipline-specific.

Graphical plot of the Lotka function described in the text, with C=1, n=2

The general formula says:

${\displaystyle X^{n}Y=C}$

or

${\displaystyle Y=C/X^{n},\,}$

where X is the number of publications, Y the relative frequency of authors with X publications, and n and ${\displaystyle C}$ are constants depending on the specific field (${\displaystyle n\approx 2}$).