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Why would a company like Twitter be interest in algebraic concepts like groups, monoids and rings. https://github.com/twitter/algebird

All I could find is:

Implementations of Monoids for interesting approximation algorithms, such as Bloom filter, HyperLogLog and CountMinSketch. These allow you to think of these sophisticated operations like you might numbers, and add them up in hadoop or online to produce powerful statistics and analytics.

and in another part of the GitHub page:

It was originally developed as part of Scalding's Matrix API, where Matrices had values which are elements of Monoids, Groups, or Rings. Subsequently, it was clear that the code had broader application within Scalding and on other projects within Twitter.

What could this broader application be? within Twitter and for general interest?

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closed as off topic by Josh Caswell, icepack, Frank Osterfeld, Leo, Don Roby Feb 9 '13 at 19:34

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Asking for speculation doesn't make for a good question. But note that group theory underpins almost all of of applied mathematics so if you want to do anything with statistics or prediction or whatnot, it doesn't hurt to have the appropriate algebraic structures in your pocket. –  Rex Kerr Feb 9 '13 at 19:32
    
What groups are used in computer science besides integers, reals and direct sums thereof? My hope is that someone twitter would have had an answer to my question - then it would not be speculative. –  john mangual Feb 9 '13 at 20:01
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There are all sorts of applications of matrices in statistics, machine learning, etc.; quaternions and other odd beasts get used in computer graphics; and there are all sorts of things that actually are (probably infinite, theoretically) groups that we don't normally think of as such. (Strings? Boolean?--really, it's hard to find something that doesn't have the structure of at least a semigroup or somesuch.) –  Rex Kerr Feb 9 '13 at 20:10
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I do not believe this is off-topic. Discrete mathematics is the foundation of computing. We ignore these theoretical underpinnings at our peril. It boggles my mind that software practitioners eschew formalism while still wishing to be called engineers and thought of as professionals. Do practitioners of any other engineering field reject formal mathematical foundations? No! They've learned from failures and catastrophes. But, inexplicably, people who create software systems insist on a purely intuitive approach. Until that changes, we will continue to be "hobbyist professionals." –  Randall Schulz Feb 9 '13 at 22:13
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@johnmangual, repost this question in quora. –  pedrofurla Feb 9 '13 at 22:16