Sujet : Re: Another Halting Problem Question (very difficult)
De : wyniijj5 (at) *nospam* gmail.com (wij)
Groupes : comp.theoryDate : 29. May 2024, 02:31:29
Autres entêtes
Organisation : A noiseless patient Spider
Message-ID : <1f231ededa977e799945496518d7aa8e2f7efc4a.camel@gmail.com>
References : 1 2 3
User-Agent : Evolution 3.50.2 (3.50.2-1.fc39)
On Wed, 2024-05-29 at 06:55 +0800, wij wrote:
On Wed, 2024-05-29 at 06:20 +0800, wij wrote:
On Wed, 2024-05-29 at 05:37 +0800, wij wrote:
Everybody knows the Halting Problem is undecidable (liars also know). But if we
restrict the condition a little bit: Does there exists a decision function h, h
determines whether or not an arbitrary function void f() (given as the argument
of h) terminates or not (h,f∈O(2^N)) ? IOW, h(f)==true iff f() terminates.
Sorry, too quick in rephrasing the real problem. I should fix this latter.
Correction:
Does there exist a O(2^N) decision function sat, sat terminates whether or not
a O(2^N) function bool f() (given as the argument of sat) returns true or not?
IOW, sat(f)==true iff f()==true
Revision:
Does there exist a decision function sat that determines whether or not a
terminating function bool f() (given as the argument of sat) returns true or
not? IOW, sat(f)==true iff f()==true.
Is Rice's theorem (or GUR if you like) refuted?
Another Halting Problem Question (very difficult)
Re: Another Halting Problem Question (very difficult)