AkiThePirate wrote:This thread is both for discussion of Godel's Ontological Theorem and a continuation of a debate which was in another thread.
Godel's Ontological Argument is expressed symbolically as:
For those unfamiliar with
modal-logic, there is an article on the general
Ontological Argument here.
With respect to the theorem's axioms, WikiPedia tells us the following:
WikiPedia wrote:We first assume the following axiom:
Axiom 1: It is possible to single out positive properties from among all properties. Gdel defines a positive property rather vaguely: "Positive means positive in the moral aesthetic sense (independently of the accidental structure of the world)... It may also mean pure attribution as opposed to privation (or containing privation)." (Gdel 1995)
We then assume that the following three conditions hold for all positive properties (which can be summarized by saying "the positive properties form a principal ultrafilter"):
Axiom 2: If P is positive and P entails Q, then Q is positive.
Axiom 3: If P1, P2, P3, ..., Pn are positive properties, then the property (P1 AND P2 AND P3 ... AND Pn) is positive as well.
Axiom 4: If P is a property, then either P or its negation is positive, but not both.
Finally, we assume:
Axiom 5: Necessary existence is a positive property (Pos(NE)). This mirrors the key assumption in Anselm's argument.
Now we define a new property G: if x is an object in some possible world, then G(x) is true if and only if P(x) is true in that same world for all positive properties P. G is called the "God-like" property. An object x that has the God-like property is called God.
For debate:
-Is the Ontological Theorem logically valid?
For brevity, I will assume so. Ontological arguments in general tend to fall prey to equivocation fallacies and at the moment I lack the time to check this one over.
-Are all the axioms of the theorem valid?
I would go so far as to say none of them are.
1. This one has a number of unjustified build it assumptions, such that there is a moral aesthetic independent of the accidental structure of the world and that positive properties exist at all as opposed to merely being a language or mathematical construct.
2. Absolutely untrue. If a value of 2 requires positiveness (it does) and 2 entails evenness, then evenness must be positive? What of -2 that entails evenness as well? Much stronger justification would be needed to demonstrate that all things that result from something positive, or that are required for something positive, are in fact themselves positive. It is entirely possible for them to be value neutral or even negative in and of themselves.
Another example, one that directly contradicts axiom 4, suppose you flip a coin. You have heads. Heads entails not tails. Thus not tails is a positive. You flip again, and you have tails, which entails not heads, which, from this must both be positive. Heads and not heads, tails and not tails, all seem to be positive per axiom 2 and yet axiom 4 says the negation cannot be positive if the property is.
3. I would challenge that having properties is in fact a property in and of itself and would further challenge that possession of properties raises the value of the possessor, as opposed to the properties themselves possessing all the value and the collection in which they fall merely existing as an example of categorical thinking with no concrete basis.
4. I touched on this one already, but this one is inconsistent with axiom 2. Beyond that, however, I would state that in any existing binary system, the negation of one state is identical (per the law of identity) to the positive state of the other. If a switch is either up or down, if it is not up, it is not just not up, it is down. Not up and down will necessarily share all properties with each other. As such, axiom 4 is demonstrably false.
5. I am going to defer to Kant on this one, existence is not predicate. Existing is not a property, it is a prerequisite to have properties. Any assertion of different kinds of existence (contingent, necessary) would require further backing to demonstrate an actual existence.
-Can the argument hold without the axioms being valid, if they are not necessarily so?
No. The conclusion might be true, but the argument itself does not hold.
Approaching this from a different angle, I would argue a being such that Godel describes requires inconsistent standards for possible worlds. In order for his argument to work all possible worlds must be open to the possibility of a supreme being when I would argue this is not so. I can imagine a world about the size of a basketball the same consistency as solid brick that exists independent of all other worlds and incapable of being interacted with in any form. So such supreme being is possible here because the world is by definition immutable and without the capacity to change it, such a being would be severely deficient. I would in turn argue the opposite of Godel, that if a possible world exists where Godlikeness is not possible, God cannot exist in any world under his criterion.
Finally, as a general request to EduChris, I would ask that you have the "Ignores the Uncivil" user group removed. I do not wish to return the thread to personal discussion, however, more than anything the group seems to have become a bludgeon with which one can hammer any individual who disagrees on style instead of the substance of their post. Indeed, I have seen it used as such when the bludgeoner does not seem to hold the civil high ground from the bludgeonee. If there are certain individuals you do not wish to debate with, speak to, or read, by all means, don't, but the continual advertisement of such only serves to, ironically, increase the level of incivility and lower the level of discourse. I have noticed a growing trend in recent threads for this user group to be brought up and then promptly devolve the thread into several pages of personal discussion, accusations, and ad homs and think for the good of the board and a general sense of order, it would be best if the group were dissolved (or at the very least never mentioned again).
