I am stuck on Kripke semantics, and wonder if there is `educational software`

through which I can test equivalence of statements etc, since Im starting to think its easier to learn by example (even if on abstract variables).

I will use

- ☐A to write necessarily A
- ♢A for possibly A

do ☐true, ☐false, ♢true, ♢false evaluate to values, if so what values or kinds of values from what set ({true, false} or perhaps {necessary,possibly})? [1]

I think I read all `Kripke models`

use the `duality axiom`

:

(☐A)->(¬♢¬A)

i.e. if its necessary to `paytax`

then its not allowed to not `paytax`

(irrespective of wheither its necessary to pay tax...)

i.e.2. if its necessary to `earnmoney`

its not allowed to not `earnmoney`

(again irrespective of wheither earning money is really necessary, the logic holds, so far)

since A->B is equivalent to ¬A<-¬B lets test

¬☐A<-♢¬A

its not necessary to `upvote`

if its allowed to not `upvote`

this axiom works dually:

♢A->¬☐¬A

If its allowed to `earnmoney`

then its not necessary to not `earnmoney`

Not all modalities behave the same, and different `Kripke model`

are more suitable to model one modalit than another: not all `Kripke models`

use the same `axioms`

. (Are classical quantifiers also modalities? if so do `Kripke models`

allow modeling them?)

I will go through the list of common axioms and try to find examples that make it seem counterintuitive or unnecessary to postulate...

- ☐(A->B)->(☐A->☐B):

if (its necessary that (earningmoney implies payingtaxes)) then ((necessity of earningmoney) implies (necessity of payingtaxes))

note that earning money does not imply paying taxes, the falsehood of the implication A->B does not affect the truth value of the axiom...

urgh its taking too long to phrase my problems in trying to understand it all... feel free to edit