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Just now I needed a definition and discussion of term algebra for the new entry on Lindenbaum-Tarski algebra. I noted we have Lindenbaum algebra in several places with no explanation. I am no logician and have very few logic books available. Are these the same and what generality should be used for the term algebra.
I also looked at the entry on Boolean algebra and was a bit surprised to find there was no elementary algebraic version given. This is the (for dummies) version perhaps, but seeing one of the usual algebraic description and examples (although these are in the Wikipedia page I’m sure) might enable the ideas about Heyting algebras, lattices, etc., there to be more useful. I’m not sure what level to pitch any additions to that entry, any ideas or thoughts anyone?
I’m pretty sure they’re the same thing — just the usual term model.
As I understand it for a logic you identify terms in the underlying language if ’one iff t’other’ is in the logic, so there is some confusion. (I think L and L-T are probably names for the same thing.)
I also looked at the entry on Boolean algebra and was a bit surprised to find there was no elementary algebraic version given.
Done.
Wikipedia leaves out the first two of my identities, but I don’t see how to prove them.
Thanks. I did not want to suggest a notation or a viewpoint as the BAO entry is not that central to the modal logics yet.
Mathematical Query: a Boolean with operators which is a closure algebra and a ’monadic’ algebra models S5. This is one of the epistemic logics and its frames are sets with an equivalence relation on them. The multimodal logic S5(n) has Kripke models based on a set with n-equivalence relations defined on it. Similarly the modal algebra has n-closure operators all of which are ’monadic’. A set with n-equivalence relations naturally suggests an n-fold groupoid structure.
What is the algebraic dual of an n-fold groupoid?
NB. The modal operators in the BAO preserve one of the structures but not both in general, so may be ’additive’ and th dual operation multiplicative. The usual duality theory at the set/BA level allows one to switch between the two forms of semantics. But what about replacing the equivalence relations with groupoids. David C. led a Café discussion on this area some time ago but I’m not sure that we got anywhere. Thoughts anyone?
I have added the construction of the canonical model to the entry on maximal consistent sets.
Our entry on Lindenbaum-Tarski algebra only discusses modal logics, not even mentioning the simpler cases of propositional logi that correspond to Heyting and Boolean algebras. Is this just because no one has written about them, or is there a deeper reason?
I reckon it’s just because we were in a modal logic phase at the time.
Yes, I wrote some of that and was trying to get some modal stuff down to give a slightly richer view of logic. Then David took up the thread, and it went on from there. We should have more there.
Okay, I added a brief comment at the top giving a broader scope. I don’t have time to do more at the moment.
I find the statement of the Examples confusing. It says:
The Lindenbaum–Tarski algebra of intuitionistic propositional logic is a Heyting algebra.
The Lindenbaum–Tarski algebra of a classical propositional logic is a Boolean algebra.
I would understand it either if it were
The Lindenbaum–Tarski algebra of a theory in intuitionistic propositional logic is a Heyting algebra.
or else
The Lindenbaum–Tarski algebra of intuitionistic propositional logic is Heyting algebra.
(wihtout the “a”).
Which one is it?
I would say “of a theory”. (The latter could then be interpreted as saying that the Lindenbaum-Tarski algebra of pure intuitionistic propositional logic (i.e., of a theory given by an empty collection of axioms) is a free Heyting algebra.)
Fixed.
I fixed some formatting issues.
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