I, at least, was not suggesting that you don’t know the difference, merely that your article failed to take account of the difference and was therefore confusing and initially unconvincing to me because I was taking account of that difference.
However (and it took me too damn long to realise this; I can’t wait for Logic and Set Theory this coming year), I wasn’t talking about “models” in the sense that pebbles are a Model of the Theory PA. I was talking in the sense that PA is a model of the behaviour observed in pebbles. If PA fails to model pebbles, that doesn’t mean PA is wrong, it just means that pebbles don’t follow PA. If a Model of PA exists in which SS0+SS0 = SSS0, then the Theory PA materially cannot prove that SS0+SS0 ≠ SSS0, and if such a proof has been constructed from the axiomata of the Theory then either the proof is in error (exists a step not justified by the inference rules), or the combination of axiomata and inference rules contains a contradiction (which can be rephrased as “under these inference rules, the Theory is not consistent”), or the claimed Model is not in fact a Model at all (in which case one of the axiomata does not, in fact, apply to it).
I should probably write down what I think I know about the epistemic status of mathematics and why I think I know it, because I’m pretty sure I disagree quite strongly with you (and my prior probability of me being right and you being wrong is rather low).
I, at least, was not suggesting that you don’t know the difference, merely that your article failed to take account of the difference and was therefore confusing and initially unconvincing to me because I was taking account of that difference.
However (and it took me too damn long to realise this; I can’t wait for Logic and Set Theory this coming year), I wasn’t talking about “models” in the sense that pebbles are a Model of the Theory PA. I was talking in the sense that PA is a model of the behaviour observed in pebbles. If PA fails to model pebbles, that doesn’t mean PA is wrong, it just means that pebbles don’t follow PA. If a Model of PA exists in which SS0+SS0 = SSS0, then the Theory PA materially cannot prove that SS0+SS0 ≠ SSS0, and if such a proof has been constructed from the axiomata of the Theory then either the proof is in error (exists a step not justified by the inference rules), or the combination of axiomata and inference rules contains a contradiction (which can be rephrased as “under these inference rules, the Theory is not consistent”), or the claimed Model is not in fact a Model at all (in which case one of the axiomata does not, in fact, apply to it).
I should probably write down what I think I know about the epistemic status of mathematics and why I think I know it, because I’m pretty sure I disagree quite strongly with you (and my prior probability of me being right and you being wrong is rather low).
Scientists and mathematicians use the word “model” in exactly opposite ways. This is occasionally confusing.