Liste des Groupes | Revenir à theory |
On 7/22/2024 7:17 PM, Richard Damon wrote:So, is Goldbach'c conjecture possibly true in the formal system ofOn 7/22/24 8:11 PM, olcott wrote:You seem to be too stupid about this too. You are too stupid to graspOn 7/22/2024 7:01 PM, Richard Damon wrote:What makes it different fron Goldbach's conjecture?On 7/22/24 12:42 PM, olcott wrote:*No stupid I have never been saying anything like that* If g andI have focused on analytic truth-makers where an expressionSo, now you ADMIT that Formal Logical systems can be
of language x is shown to be true in language L by a sequence
of truth preserving operations from the semantic meaning of x
in L to x in L.
In rare cases such as the Goldbach conjecture this may
require an infinite sequence of truth preserving operations
thus making analytic knowledge a subset of analytic truth. https://en.wikipedia.org/wiki/Goldbach%27s_conjecture
There are cases where there is no finite or infinite sequence
of truth preserving operations to x or ~x in L because x is
self- contradictory in L. In this case x is not a
truth-bearer in L.
"incomplete" because there exist analytic truths in them that
can not be proven with an actual formal proof (which, by
definition, must be finite).
~g is not provable in PA then g is not a truth-bearer in PA.
You are just caught in your own lies.
YOU ADMITTED that statements, like Goldbach's conjecture, might be
true based on being only established by an infinite series of
truth preserving operations.
the idea of true and unknowable.
In any case you are not too stupid to know that every expression that
requires an infinite sequence of truth preserving operations would
not be true in any formal system.
But the rules of construction of MM prove that statements matchingIn PA, G (not g, that is the variable) is shown to be TRUE, butNo stupid that is not it. A finite sequence of truth preserving
only estblished by an infinite series of truth preserving
operations, that we can show exist by a proof in MM.
operations in MM proves that G is true in MM. Some people use lower
case g.
Here is the convoluted mess that Gödel uses https://www.liarparadox.org/G%C3%B6del_Sentence(1931).pdfAnd your inability to understand it doesn't make it wrong.
Really, then show what number g could possibly sattisfy the relationship.The truth of G transfers, because it uses nothing of MM, the ProofNo stupid that is not how it actually works. Haskell Curry is the
does not, as it depends on factors in MM, so can't be expressed in
PA.
only one that I know that is not too stupid to understand this. https://www.liarparadox.org/Haskell_Curry_45.pdf
Les messages affichés proviennent d'usenet.