I'm going to teach myself some math, and I'll be asking lots of potentially stupid questions. First up: Is there a difference between saying "a vector space" and "a set of vectors" ?
-
-
Yeah, but an inner product space is still *a* vector space. That's what was throwing me. Thanks!
-
Prove it.
-
I could, but not in finite time.
-
In a twist, it turns out that P really does = NP, but because all of the P problems ended up being NP problems
-
This is also how a genie would grant a mathematician's wish for a proof of P = NP
End of conversation
New conversation -
Loading seems to be taking a while.
Twitter may be over capacity or experiencing a momentary hiccup. Try again or visit Twitter Status for more information.