I know relational databases are based on settheory, functional programming is based on lambda calculus, logic programming is based on logic (of course :)), and now that I think of it; I'm not sure if imperative and generic programming is based on any particular branch of mathematics either.
closed as not constructive by K̨̩̭͚̘̗̻̞͈͖̙͙e̗̦̼̳̣̦͜͡v̢̝̟̗̱̯͉ Nov 10 '11 at 23:15As it currently stands, this question is not a good fit for our Q&A format. We expect answers to be supported by facts, references, or expertise, but this question will likely solicit debate, arguments, polling, or extended discussion. If you feel that this question can be improved and possibly reopened, visit the help center for guidance.If this question can be reworded to fit the rules in the help center, please edit the question. 


OOP does not originate from any strict formalism, but it is a formalism indeed. There were a number of attempts to define that formalism properly. Most notable work is done by Luca Cardelli: http://lucacardelli.name/indexPapers.html (see the whole "Objects" section) Imperative programming could be based on any Turingequivalent formalism, including lambda calculus, SK logic, Turing abstract machine, Markov algorithms, or any other similar Term Rewriting System (TRS). Generic programming is not any different, it is a term rewriting system of a sort. So, for the most common mathematical grounds for literally everything you'd need to dig into term rewriting systems. A more recent work is AbdelGawad's recent work at Rice University. He builds a mathematical model of mainstream OOP (eg, Java, C#, C++, Scala, X10, etc) called NOOP. Here is a link to his PhD thesis http://scholarship.rice.edu/handle/1911/70199 


OOP has its origins in programming languages like Simula67 and Smalltalk80, rather than any mathematical theory or formalism. But I suppose that you could say that OOP's object, class and inheritance concepts are based on naive or commonsense systems of categories and classification; e.g. the taxonomies developed by Linnaeus. 

