John Page

I'm with you Ron - now if I could only explain to myself properly how mental reality arises from a physical process we could be more objective about the way we think....

Cheers, john

Sun Dog

Brent1 has stated that he will be replying to this thread as soon as he finishes a term paper and some other unspecified tasks. I hope he has the opportunity to come back; I made some criticisms of his original post, and I'd very much like to hear his response to them.

Sun Dog

Sun Dog

Brent1 still hasn't gotten back to us yet, so I thought I'd respond to one of John Page's recent posts.

I'm not entirely sure I'm following you here, so correct me if I seem off track. But you seem to be saying that conventional logical notation somehow violates the law of identity. Would you mind explaining why you believe this to be so? I for one am having a very difficult time imagining a value of T such that T = T (as interpreted by conventional notation) is not true!

As for your slippery versions of the three laws, none of them is actually equivalent to the conventional version, and none of them are necessarily true as the conventional ones are. I can't think of a value for T such that T = T is false, but I can think of plenty of values for r0T and r1T such that r0T = r1T is false. Indeed, it doesn't seem to be possible to express the Laws of Identity, Noncontradiction, or Excluded Middle at all using slippery notation. So why use it? What advantages are there to be gained?

In fact, I see one further problem with your system. From what I've seen, you seem to want to impose a rule that no variable may be used more than once in a single chain of reasoning. Thus, T = T becomes r0T = r1T, T = (T & ~T) becomes r0T = (r1T & ~r2T), etc. Let's call this the Slippery Rule: No chain of reasoning may use the same variable more than once. Now here's the problem. The Slippery Rule cannot be formulated in a proposition that adheres to the Slippery Rule!

To see why, let's consider what the Slippery Rule might look like in conventional notation. A formal version of the Slippery Rule might look like this: "A chain of reasoning C is valid if and only if for all X and Y such that X and Y are variables used in C, it is not the case that X is the same as Y." Now try altering the statement to follow the Slippery Rule. You'd wind up with something like "A chain of reasoning C is valid if and only if for all X and Y such that Z and W are variables used in P, it is not the case that I is the same as J." I think that strictly speaking, this new version is not even a sensible proposition, since Z, W, P, I and J are never really defined. But even if they were, the point is that this new version doesn't actually place any limits on the validity of C. If X and Y are the same variable, that's just fine as far as this new statement is concerned.

So, if the Slippery Rule is to be followed, then we have a choice to make. We can either choose to follow the conventional notation version of the Slippery Rule, in which case we are contradicting ourselves because the conventional version of the Slippery Rule does not itself follow the Slippery Rule. Or, we can follow the slippery notation version of the Slippery Rule, in which case we end up acting just as if we'd never adopted the rule at all. Either way, the Slippery Rule (and by extension, slippery notation) ends up being self-defeating.

I'm not even sure what you mean by computers and minds "magically making things identical", or why you think this claim is relevant here. I'm not saying that computers or minds magically make things identical. What I am saying is that when formulating logical propositions for employment in a chain of reasoning, it is perfectly legitimate to use the same variable more than once, with the understanding that this variable has the exact same meaning each time it appears.

Sun Dog

John Page

Sun Dog:

Thanks for your response. Let me say first that I'm trying to develop a model that explains (in a cognitive/phenomenological sense) how logic works.

Its my underlying concern - that it seems OK to say that something is only itself, unique etc. but also OK to imply that something is something else for the purposes of deciding truth.

I'm saying that conventional logical notation does not accurately represent what is going on (under some circumstances) such that the LOI might be violated.

Example: The Watergate Paradox
Agreed - as long as one understands that T is a symbol that refers to the same subject every time it is used. Hopefully the Watergate example shows how applying conventional rules for propositional logic using the different notation avoids the contradiction arrived at conventional notation.
But the variables really are slippery, nevertheless. I'm not insisting all variables be different variables, I'm proposing a prefix notation so context/abstraction/self-reference issue are avoided (in the true spirit of the LOI )
Try "A deduction using the Ontologic system (that's what I call it) is only valid if and only if the notation of the system makes clear which instances of symbols within the system represent the subject under study, and which are representations for the purposes of comparison under the system."
Also, here's the first Axiom for OntologicI suggest you consider the meaning of your expression ..."it is not the case that X is the same as Y." If it is the case that X is the same as Y then we're right back to the LOI issue. I'm not sure what else to suggest to make it clearer but offer a computer example - the language 'C' is implemented by using a pointer to the (starting address of the) actual value of the variable in memory and one can manipulate that pointer directly. All I'm suggesting is that to be rigorous in logic we need to specifically declare each instance of a variable to denote its context within the expression to be evaluated. The 'C' compiler turns expressions like if(A,B=C,A=!A) into implementable code in a specific sequence.
I hope my Watergate example is sufficiently clear on the issues that arise if one doesn't follow the same kind of discipline in logic.
My Slippery Rule is much more slippery than yours!

Thanks for taking the time to go through my post.

Cheers, John

cobrashock

Or could it be that A=A can never be equal because A has to be defined and that defined wording can never be identical, so the definition describes something, even a proper name? It bepends on how far you want to persuit the definition I would say.
cobrashock