Continued from above.
Okay. So you’re saying the sum total of all contingencies is not possibly externally caused? And why? You think we don’t know what ‘external cause’ means here? However you define causation (“actualization”, “constant conjunction of events”, “necessitation”, whatever) the concept can be applied. I don’t see anything logically impossible about it. And you have a problem with the idea of “the sum total of all contingencies”? Be clear and explain what the problem is, and why it makes it impossible that C is externally caused.
Prima facie, I don’t find these “possible” objections compelling at all. I’d like you to really focus in here. The rest we should pick up on later.
As you say, let’s concentrate on this problem. First, is the “set of all contingencies” a valid, coherent structure? It is not. I mentioned the Russell paradox, and this construct is just another example of it.
Let’s examine an identical concept. Let’s divide all the sets into two subsets: 1) those sets which do not contain themselves as a member, and 2) those sets, which contain themselves as members. (Remember a “set” is an arbitrary collection of anything!). Let’s call the sets of the first type “regular” sets, while the sets of the second type “irregular” sets. Now let’s collect all the regular sets into a “super-set”, and present the question: “is this super-set regular or not?”. The answer is a paradox: if it is a regular set, then it must be included, since we collected all the regular sets, therefore it contains itself as a member, therefore it is not a regular set, so it cannot be included. A clear equivalent of the “this sentence is false” type of self-contradiction.
Therefore the aggregate set of “all contingencies” is not a valid set. Just like we cannot posit the the aggregate of all “regular” sets, we cannot posit the “set of all contingencies” as a valid set. No matter how causation is defined, it cannot be applied to an undefinable set.
For those, who might find these “regular” and “irregular” sets confusing, I will give another example, called the “barber of the army”.
Let’s consider an army, where the job of all members is clearly defined. There is a rule in this army, which says that no one can wear any facial hair, everyone must always be clean-shaven. However, not all the soldiers shave themselves. There is a barber in the army, whose job is to shave all those soldiers who do not shave themselves. However, he is forbidden to shave anyone who does shave himself. So the question arises: what can he do about his own facial hair? If he starts to shave, he is one of those soldiers, who shave themselves, and so he cannot continue according to the rule. As soon as he asks another soldier to shave him, he is one of those solders who do not shave themselves, and so he must shave himself. A clear contradiction: the ruleset leads to a paradox. Exactly as in your stipulated “set of all contingencies”.
I think you don’t understand what I was saying because that’s not what I was doing at all. That may be my fault. Okay. If X is necessary then X obtains in all possible worlds. That is equivalent to saying that if X is necessary then there is no possible world where X does not obtain. This is equivalent to saying if X is necessary then it is impossible that X not obtain. So I follow this general line of reasoning. X is necessary. In your scenarios S and S, X does not obtain. Therefore S and S are impossible.
I think I did understand you perfectly. You put the cart in front of the horse. It is true, if there is a necessary entity, then it would be part of my stipulated worlds (S and S*). Since it is not included, all you can say that “
ex hypotesi” they cannot be possible worlds. But that is not acceptable. You cannot start with positing your hypothesis and then use it as a supporting argument. That is a logical error. Until the hypothesis is established, you cannot use the hypothesis to differentiate between “possible and impossible” worlds!
Now, let’s get down to a constructive proof again. We have two possible staring points, either our current, existing world, or the suggested “mini-worlds”. I will explore both cases.
Let’s start with our existing world, which is obviously possible. Let’s remove
objects which are at the end of some causal chain. The resulting world will always be a possible world, since the end of any causal chain can always be removed. At the end of this process we shall arrive at the mini-worlds, by removing everything except those quarks. Since the quarks are the final building blocks of matter, they cannot be at the “end point” of a causal chain. So the S and S* are possible worlds.
Let’s start with either one of the mini-worlds (S or S*), and keep adding entities and causal chains to it. At the end of this process we shall arrive at our existing world, if we do it judiciously. So starting from the mini-worlds we can build our world, and since successive additions will always yield a possible world, and at the end of the building process we arrive at our existing world, we prove that the starting point was a possible world as well. It is obvious that from an
impossible world you cannot create a possible world by
adding something to it.