FermisPairOfDucks
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- TL;DR
- Is infinity worth the trouble that it brings?
How fundamental is the concept of "infinity" to mathematics? Is it just a necessary idea to say that a limit has converged? I sometimes worry about the thought experiments that people come up with:
1) monkeys recreating Shakespeare
2) there must life out there because space is "infinite" so the Drake Equation doesn't apply
3) "infinite" series of positive numbers converging to -1/12
I realize that there are many useful ideas that come of out theories of infinite sets, but in the age where computers can really allow us to look at small numbers (but not necessarily "infinitesimals") in a way where we can say that they are "close enough" to get "accurate enough" answers, do we really still need this concept?
I've heard that there are some mathematicians out there who are trying to recreate important results without referring to infinity, but I've also heard that this is a very "fringe" pursuit.
Thanks to anyone who can help me clarify my thoughts on this.
1) monkeys recreating Shakespeare
2) there must life out there because space is "infinite" so the Drake Equation doesn't apply
3) "infinite" series of positive numbers converging to -1/12
I realize that there are many useful ideas that come of out theories of infinite sets, but in the age where computers can really allow us to look at small numbers (but not necessarily "infinitesimals") in a way where we can say that they are "close enough" to get "accurate enough" answers, do we really still need this concept?
I've heard that there are some mathematicians out there who are trying to recreate important results without referring to infinity, but I've also heard that this is a very "fringe" pursuit.
Thanks to anyone who can help me clarify my thoughts on this.