Questions from a new introduction to modal logic by Hughes and Cresswell

Question

Note:

There is a lack of consistency regarding symbols for modal operators. Hughes and Cresswell use a different symbolization schema than many and a comment about L & M may provide clarity for reader unfamiliar with their notation.

They use L for the necessity operator.
They use M for the possibility operator.

So for those not familiar with this scheme: L = ◻ and M = ◇

I just want to see if I got this correct.

Show that the following wff is valid in every seating arrangement: Mp -> (Lq->Mq).

Here's my argument:

Assume player A sees at least one player B that raises his hand for p, and thus also A raises his hand for Mp.

Assume player A doesn't raise his hand for Lq ->Mq, but he raises his hand for Lq but not for Mq.

Then player A sees all other players raising their hands for q, and thus A raises his hand for Mq, contradiction.

Another question from the same book.

exercise 1.2: show that in any seating arrangement in which there's a player who cannot see himself Lp->p isn't valid.

My answer: Suppose A cannot see himself. Let p be on every player's sheet except A's. Suppose that A raises his hand for Lp->p then he must raise his hand for p, since he raised his hand for Lp, but he cannot see everyone's sheet (only his own), so he should keep his hand down for p, and we get that Lp->p isn't valid.

Is my reasoning ok or not?

Answer 1

Player-A says p is possible, exactly when player A can see someone who raises their hand for p. That means, when player-A says p is possible, then player-A can see someone.

Player A says q is necessary, exactly when everyone player-A can see raises their hand for q.

Thus if player-A can see someone, then if everyone player-A can see raises their hand for q, then player-A can see someone who raises their hand for q.

Mp -> (Lq -> Mq)

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exercise 1.2: show that in any seating arrangement in which there's a player who cannot see himself Lp->p isn't valid.

My answer: Suppose A cannot see himself. Let p be on every player's sheet except A's. Suppose that A raises his hand for Lp->p then he must raise his hand for p, since he raised his hand for Lp, but he cannot see everyone's sheet (only his own), so he should keep his hand down for p, and we get that Lp->p isn't valid.

Is my reasoning ok or not?

It is not. The criteria is that the player cannot see his self.

Answer 2

Before

and thus A raises his hand for Mq, contradiction

you could add:

and thus B raises his hand for q,

Then you have shown your formula in all seating arrangements, which is Hughes and Cresswell's way of saying "in all Kripke frames".

Answer 3

From the OP:

Assume player A doesn't raise his hand for Lq ->Mq, but he raises his hand for Lq but not for Mq. (emphases added).

How can you raise your hand for Lq but not for Mq? By the rules, to raise your hand for Lq, every player you can see raised their hand for q. But the only scenario where you keep your hand down for Mq is if no one you can see raised their hand for q.

The 2nd assumption implies that both everyone (that Player A can see) raised their hand for q and yet no-one (again that Player A can see) raised their hand for q.

From the book (p. 18):

4. If Lα is called (where α is a wff of modal logic), raise your hand if every player you can see raised his or her hand when α was called; otherwise keep your hand down.
5. If Mα is called raise your hand if at least one of the players you can see raised his or her hand when α was called; otherwise keep your hand down.

Unfortunately the second assumption of the argument contains a contradiction.