This question has two original motivations: mathematical and social. 

**The mathematical motivation** is mainly based on what I have seen about [Zipf's law][1] here and there. The Zipf's law simply states that a Zipfian distribution (a variant of [power-law probability distribution][2]) provides a good approximation of many types of data corresponding to physical or social phenomena. 

The iconic example is the frequency of the words used in a natural language where the Zipf's law indicates that the most frequent word in the language will occur approximately twice as often as the second most frequent word, three times as often as the third most frequent word, etc. 

- There are plenty of other surprising appearances of Zipf's (and power) law in various real-world situations which made me think whether Zipf/power-law distributions appear, in one way or another, in large mathematical research databases such as Arxiv, MathSciNet, or MathOverflow, say in the number of publications, citations, reputation score, etc.

**The social motivation**, however, comes from occasional general claims by some mathematicians about how the mathematical society was, is or will be. Statements such as the followings: 

- The mathematical paradigm is slowly shifting from pure mathematics to applied as more and more mathematicians are doing research of applied nature. 

- In comparison with other branches of logic, model theory has the strongest ties with other mathematical disciplines. 

- Due to the urgent need and rapid advancement in AI and computer science, computability and complexity are the most rapidly expanding branches of mathematical logic.  

- The most influential work of a mathematician usually happens before age 40. 

Such controversial claims often provoke intense arguments among the mathematicians. The question is how to settle them once for all. Indeed, a  *rigorous* approach towards verification of any such social claim is to mathematically analyze the large mathematical databases such as Arxiv, MathSciNet, or MathOverflow in order to extract general *patterns* including the distribution of research topics, possible changes in mathematical research *fashion* and evaluating the amount of interaction and intersection which various mathematical disciplines have with each other.   

These motivations lead to the following general question: 

> **Question.** Have large mathematical databases such as Arxiv, MathSciNet, or MathOverflow been the subject of any [social network and database analysis][3] so far? What are examples of published mathematical research about possible mathematical patterns that may exist in them as databases? What patterns are found? (I am particularly interested in the case of Zipf's law.)   

It is likely that some journal ranking organizations have already conducted some research along these lines but I haven't seen any outline so far. It is also interesting if the research has been done in a comparative way which allows one to compare the general characteristics of math community with its other counterparts, say physics or biology.    


  [1]: https://en.wikipedia.org/wiki/Zipf%27s_law
  [2]: https://en.wikipedia.org/wiki/Power_law
  [3]: http://%20https://en.wikipedia.org/wiki/Social_network_analysis