Difference between revisions of "Spaced proof review is not about memorizing proofs"

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using anki as a problem bank (with my proofs deck): the spacing is more to make sure seeing the same problem over and over again does not trigger your annoyance threshold, than to memorize optimally. actually you're not even trying to memorize the proofs, but to "absorb the rhythm" of the underlying concepts. When you're proving things, there's a bunch of non-verbal instincts/"mental moves" that go on (which are pretty hard to consciously observe/reason about). The point isn't to do like supervised learning on the text of the proof and be able to reproduce it perfectly. instead, you're training yourself to practice these mental moves, in a spaced out way (spacing it out makes it non-annoying, and verifies that the ability is an instinct rather than a reflex/rote-memorized).
 
using anki as a problem bank (with my proofs deck): the spacing is more to make sure seeing the same problem over and over again does not trigger your annoyance threshold, than to memorize optimally. actually you're not even trying to memorize the proofs, but to "absorb the rhythm" of the underlying concepts. When you're proving things, there's a bunch of non-verbal instincts/"mental moves" that go on (which are pretty hard to consciously observe/reason about). The point isn't to do like supervised learning on the text of the proof and be able to reproduce it perfectly. instead, you're training yourself to practice these mental moves, in a spaced out way (spacing it out makes it non-annoying, and verifies that the ability is an instinct rather than a reflex/rote-memorized).
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See also Tim Gowers on memorizing proofs, e.g. [https://gowers.wordpress.com/2011/09/23/welcome-to-the-cambridge-mathematical-tripos/], [https://mathoverflow.net/a/3957]
  
 
[[Category:Spaced repetition]]
 
[[Category:Spaced repetition]]

Revision as of 07:26, 14 June 2020

Spaced proof review involves proving a result at spaced intervals with the help of Anki. And Anki is about memorizing things. So at first glance, it seems like the goal of spaced proof review is to memorize proofs. But this is not how I like to think about it. It's true that you want to be able to prove the same results over a long period of time, but the way you attain this ability isn't to memorize the proofs. Instead, you're trying to acquire a generic ability to prove things.

Why not just solve new problems, if you want the generic ability to prove things? Isn't that much better? Here are some reasons for preferring spaced proof review:

  • There are only so many important theorems in a given subfield of math. In real analysis, you have things like the intermediate value theorem, Bolzano-Weierstrass theorem, etc. There are only so many of these "classic" theorems. Any new problems you will have access to will necessarily be not as deep as these fundamental results.
  • You want to make sure you can still prove things you were able to prove several months or years ago. It's satisfying to know that you aren't forgetting anything important.
  • If you set things up right, there's less friction to do these problems. You don't need to go searching for solutions to check your work (because it's on the back side of the card). (Of course, the downside is that you need to put in some initial effort to make the cards.)

And of course, even if you do spaced proof review, you will be adding new proofs all the time, so you're still solving new problems. The difference is thus in whether to invest the time into reviewing the problems you've already seen. I do think that in the future, it would be nice to have something sort of like Anki which would show problems you haven't seen before (and where the problems are selected to be interesting to you/based on your tastes).

using anki as a problem bank (with my proofs deck): the spacing is more to make sure seeing the same problem over and over again does not trigger your annoyance threshold, than to memorize optimally. actually you're not even trying to memorize the proofs, but to "absorb the rhythm" of the underlying concepts. When you're proving things, there's a bunch of non-verbal instincts/"mental moves" that go on (which are pretty hard to consciously observe/reason about). The point isn't to do like supervised learning on the text of the proof and be able to reproduce it perfectly. instead, you're training yourself to practice these mental moves, in a spaced out way (spacing it out makes it non-annoying, and verifies that the ability is an instinct rather than a reflex/rote-memorized).

See also Tim Gowers on memorizing proofs, e.g. [1], [2]