Any nonconstructive proof that P=NP really is not. It would imply that the following explicit 3-SAT algorithm runs in polynomial time:
Enumerate all programs. On round i, run all programs numbered
less than i for one step. If
a program terminates with a
satisfying input to the formula, return true. If a program
terminates with a formal proof that
no such input exists, return
If P=NP, then there exists a program which runs in O(poly(N)) and outputs a satisfying input to the formula, if such a formula exists.
If P=coNP, there exists a program which runs in O(poly(N)) and outputs a formal proof that no formula exists, if no formula exists.
If P=NP, then since P is closed under complement NP=coNP. So, there exists a program which runs in O(poly(N)) and does both. That program is the k'th program in the enumeration. k is O(1)! Since it runs in O(poly(N)) our brute force simulation only requires
rounds once it reaches the program in question. As such, the brute force simulation runs in polynomial time!
(Note that k is exponential in the size of the program; this approach is not really feasible, but it suggests that it would be hard to do a nonconstructive proof that P=NP, even if it were the case.)