M
Marc_Anthony
Guest
I’m trying to understand the ontological argument. I got this form of the argument from this link: ocw.mit.edu/courses/linguistics-and-philosophy/24-00-problems-of-philosophy-fall-2005/lecture-notes/ontarg05.pdf
Ontological Argument
One of the distinctive features of the ontological argument is that it attempts to prove the existence of God simply from the concept of God. In other words, you don’t need to go searching about for God in the world; simply knowing what God is supposed to be, i.e., simply having the concept and seeing its implications, should be enough to demonstrate that God exists. So what is the concept of God we’re using?
God =df an absolutely perfect being, i.e., a being than which nothing greater is possible, a being than which nothing greater can even be conceived.
Let’s grant this concept of God (for the moment). Now you might still think that to answer whether God exists, we should get clearer on what we mean by exists. First, let’s note the difference between existing in reality and existing “in the understanding” or “in the mind”. Here are some examples:
Existent: Non-existent:
The Charles River The Fountain of Youth
Chipmunks Unicorns
Boston Atlantis 24.00 lecture 1 9/12/05
George W. Bush Sherlock Holmes
Obviously, the issue before us is not whether God exists in the mind…whether some people have an idea of God. Many people do (or seem to). The question is whether the concept they have–the idea that they associate with the term “God”–is real in the world external to the mind.
Philosophers such as Anselm and Descartes have reasoned that just as we can argue that there are things that necessarily don’t exist, we can show that there are some things that necessarily exist. It is plausible that some concepts necessarily don’t have instances because the concept is self-contradictory:
A squircle =df a square circle.
Argument for the non-existence of squircles:
The refutation is maddeningly simple.
So I think there must be something both and I and this MIT Professor are missing. Refuting it can’t be THAT easy.
What am I missing here?
Ontological Argument
One of the distinctive features of the ontological argument is that it attempts to prove the existence of God simply from the concept of God. In other words, you don’t need to go searching about for God in the world; simply knowing what God is supposed to be, i.e., simply having the concept and seeing its implications, should be enough to demonstrate that God exists. So what is the concept of God we’re using?
God =df an absolutely perfect being, i.e., a being than which nothing greater is possible, a being than which nothing greater can even be conceived.
Let’s grant this concept of God (for the moment). Now you might still think that to answer whether God exists, we should get clearer on what we mean by exists. First, let’s note the difference between existing in reality and existing “in the understanding” or “in the mind”. Here are some examples:
Existent: Non-existent:
The Charles River The Fountain of Youth
Chipmunks Unicorns
Boston Atlantis 24.00 lecture 1 9/12/05
George W. Bush Sherlock Holmes
Obviously, the issue before us is not whether God exists in the mind…whether some people have an idea of God. Many people do (or seem to). The question is whether the concept they have–the idea that they associate with the term “God”–is real in the world external to the mind.
Philosophers such as Anselm and Descartes have reasoned that just as we can argue that there are things that necessarily don’t exist, we can show that there are some things that necessarily exist. It is plausible that some concepts necessarily don’t have instances because the concept is self-contradictory:
A squircle =df a square circle.
Argument for the non-existence of squircles:
- The concept of a squircle is a concept of a figure that is both square and circular.
- Something square and circular cannot possibly exist.
- The concept of a squircle is a concept of something that cannot possibly exist.
- Therefore, (necessarily) no squircles exist.
But are there also concepts that necessarily have instances? The suggestion before us is that the concept of God is such a concept.
In order to follow the reasoning we need to consider the idea that existence is a perfection. What does this mean? Consider a fictional character, e.g., Sherlock Holmes. Sherlock Holmes, is imperfect. He’s imperfect in many ways (e.g., he smokes, he is impatient, can be arrogant, etc.). But one of his imperfections, it seems, is that he doesn’t exist! The claim seems to be that any merely possible (non-actual) object would be more perfect if it existed. So Sherlock Holmes is not perfect, in part because he doesn’t really exist, but only exists in stories.
So, putting these ideas together, here is one version of the ontological argument: - The concept of God is the concept of an absolutely perfect being, i.e., that than which nothing greater is possible.
- Existence is a perfection, i.e., a “great making” property: it is greater to exist than not to exist.
- Because existence is a perfection, i.e., a “great making” property, if God didn’t exist in reality (but only in the understanding), then it would be possible for there to be something even greater than God, i.e., with all of God’s qualities plus existence. But this is impossible, given the definition of God.
- So the concept of God is the concept of an existent being.
- Therefore, God exists.
The refutation is maddeningly simple.
- The Perfect Island
For Anselm there is only one thing whose essence includes existence, and that is God. But where is this restriction coming from? Why can’t there be other things whose essences have this marvelous feature? And why can’t we then prove these other things to exist just as Anselm has proved God to exist?
Note that the same form of argument Anselm offered to prove God exists can be offered in support of the existence of a perfect island. Suppose:
X is a superisle iff x is an absolutely perfect island.
24.00 lecture 2 9/12/05
If you substitute ‘superisle’ for ‘God’ in the argument above, it should show that there exists a superisle. But there is no superisle. So something must be wrong with the argument.
So I think there must be something both and I and this MIT Professor are missing. Refuting it can’t be THAT easy.
What am I missing here?