![]() ![]() But I'd be most interested in hearing about uses for number theory that aren't so obviously near the borders of the subject.īackground In my own work, I often find myself needing to learn bits and pieces of other parts of mathematics. One could answer the question in many ways by naming features on that part of the mathematical landscape. What are some plausible situations where they might, nevertheless, need to learn or use some number theory?Įdit It was swiftly pointed out by Vladimir Dotsenko that the borders between number theory and algebraic geometry, and between number theory and algebra, are long and interesting. To put it another way still: imagine a mathematician with no interest in number theory for its own sake. To put it another way: what interesting questions are there that don't appear to be about number theory, but need number theory in order to answer them? ![]() ![]() Where is number theory used in the rest of mathematics? ![]()
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