I'll give Maydole's argument without my objections so that everyone can absorb it undisturbed by my objections and see what everyone thinks of it before I cut in.
I mentioned Maydole's argument for perfection in one of the other threads in the sense of providing his definition for what qualifies as a "perfection" (when it comes to attributes.)
Maydole says essentially that a perfection entails:
1) That a property is a perfection iff (if and only if) its negation is not a perfection.
2) That perfections entail only perfections.
By this Maydole means that something is perfect in a context if and only if the negation of that perfection is not a perfection. Example: A perfect meterstick is a meterstick long. A non-meterstick is clearly not a meterstick long. It's still a subjective term, it still depends on what the context is: but clearly a property is perfect only if its negation isn't perfect. This is obviously true.
Perfections only entail perfections: let's say that we have a property A which is perfect (in whatever subjective context that we declare it's perfect), and property A relies on property B to be perfect. Clearly, if property A is perfect than property B also has to be perfect. This is also obviously true. Example: If A is a perfect Euclidean square, then it relies on property B of its angles which must be perfectly 90 degrees. A perfect property can only be contingent on other perfect properties, or else it isn't perfect.
In this sense, Maydole uses "perfection" as a property that is better to have than to not have.
So Maydole starts with:
1) A property is a perfection if and only if its negation is not a perfection.
2) Perfections entail only perfections.
3) Supremity is a perfection.
Maydole defines "supremity" essentially as that if X is supreme, then that means that it's not possible that there exists a Y such that Y is greater than X and it's not possible that there exists a Y such that X is not Y (and X is not greater than Y).
∀X : (¬∃Y : [Y > X])
∀X : (¬∃Y : [X ≠ Y] & [X ≤ Y])
Maydole says:
1) It's possible that a supreme being exists.
2) A supreme being exists.
3) Exactly ONE supreme being exists.
Pretty much, therefore God exists. This is because in modal logic (particularly this law is called S5):
If possibly necessarily P, then necessarily P.
Maydole says it's possible that a supreme being exists because existence is a perfection (it's better to have than not-have), therefore it's possibly necessary that a supreme being (a being with perfections) exists because it would have existence as an attribute, since it's more perfect to exist than not exist. If possibly existent, then existent. Right?
I mentioned Maydole's argument for perfection in one of the other threads in the sense of providing his definition for what qualifies as a "perfection" (when it comes to attributes.)
Maydole says essentially that a perfection entails:
1) That a property is a perfection iff (if and only if) its negation is not a perfection.
2) That perfections entail only perfections.
By this Maydole means that something is perfect in a context if and only if the negation of that perfection is not a perfection. Example: A perfect meterstick is a meterstick long. A non-meterstick is clearly not a meterstick long. It's still a subjective term, it still depends on what the context is: but clearly a property is perfect only if its negation isn't perfect. This is obviously true.
Perfections only entail perfections: let's say that we have a property A which is perfect (in whatever subjective context that we declare it's perfect), and property A relies on property B to be perfect. Clearly, if property A is perfect than property B also has to be perfect. This is also obviously true. Example: If A is a perfect Euclidean square, then it relies on property B of its angles which must be perfectly 90 degrees. A perfect property can only be contingent on other perfect properties, or else it isn't perfect.
In this sense, Maydole uses "perfection" as a property that is better to have than to not have.
So Maydole starts with:
1) A property is a perfection if and only if its negation is not a perfection.
2) Perfections entail only perfections.
3) Supremity is a perfection.
Maydole defines "supremity" essentially as that if X is supreme, then that means that it's not possible that there exists a Y such that Y is greater than X and it's not possible that there exists a Y such that X is not Y (and X is not greater than Y).
∀X : (¬∃Y : [Y > X])
∀X : (¬∃Y : [X ≠ Y] & [X ≤ Y])
Maydole says:
1) It's possible that a supreme being exists.
2) A supreme being exists.
3) Exactly ONE supreme being exists.
Pretty much, therefore God exists. This is because in modal logic (particularly this law is called S5):
Plantinga said:
- Possibly P implies Necessarily Possibly p [
]
- Possibly Necessarily P implies Necessarily p [
]
If possibly necessarily P, then necessarily P.
Maydole says it's possible that a supreme being exists because existence is a perfection (it's better to have than not-have), therefore it's possibly necessary that a supreme being (a being with perfections) exists because it would have existence as an attribute, since it's more perfect to exist than not exist. If possibly existent, then existent. Right?
