“S proves that A()=1 ⇒ U()=42. But S also proves that A()=1 ⇒ U()=1000000, therefore S proves that A()≠1”
I don’t see how this follows. Perhaps it is because, if the system was sound, it would never prove more than one value for U() for a given a, therefore by the principle of explosion it proves A()≠1? But that doesn’t seem to actually follow. I’m aware that this is an old post, but on the off chance that anyone ever actually sees this comment, help would be appreciated.
“S proves that A()=1 ⇒ U()=42. But S also proves that A()=1 ⇒ U()=1000000, therefore S proves that A()≠1” I don’t see how this follows. Perhaps it is because, if the system was sound, it would never prove more than one value for U() for a given a, therefore by the principle of explosion it proves A()≠1? But that doesn’t seem to actually follow. I’m aware that this is an old post, but on the off chance that anyone ever actually sees this comment, help would be appreciated.