Exploring the Paradoxes of Logic

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In summary, the conversation discusses the existence of paradoxes in logic and their relationship to the real world. It is argued that logic is a prescription for the universe, not a description of it, and therefore it does not necessarily reflect the true nature of reality. Additionally, there are physical analogues of paradoxes in the physical world, such as bistable states in logic devices. It is also mentioned that there are states beyond true and false in modern mathematical logic, such as unknowable, indeterminate, and immaterial. The conversation also touches on the idea that logic can lead to paradoxes when used in conjunction with certain assertions, but this does not mean that logic itself is paradoxical. Ultimately, the conversation highlights the complexities and limitations of
  • #1
Sikz
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Paradoxes exist in our logic. They do not exist in the real world (to our knowledge at least; no one has ever encountered proof of a pardox existing). Logic is sopposed to describe the real world. Could there be some sort of flaw in our logic then :S?
 
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  • #2
There are physical analogs of paradoxes in the physical world. Bistable states in logic devices for instance.

There is more to what you say though. I think the simple, everyday logic we learn is not adequate for all occasions. This is not suprising. By analogy, arithmatic and algebra will let you do your household budget, but they won't put a man on the moon. The simple logic of true/false and epistemology work for most requirements, but modern mathematical logic has other states. I'm no expert, but I believe there are states like unknowable, indeterminate, and immaterial in addition to true and false.

Njorl
 
  • #3
Sikz,
One must remember that, as Tom has stressed before, Logic is a prescription for the Universe, not a description of it. One can deduce, from Logic, what the Universe should be like if such-and-such were true...however, the Universe is not always as one deduction says it "should be". Also, if a deduction leads to a paradox, it is pretty well impossible (just my opinion) for it to be expressed in reality...

Of course, there are those who say that QM requires paradoxes of a sort, but I think QM doesn't so much counter Logic, as it does Common Sense...as such, I think that one must use a slightly refined reasoning method, but it remains in the realm of "logic", and doesn't produce paradoxes.
 
  • #4
Originally posted by Sikz
Paradoxes exist in our logic. They do not exist in the real world (to our knowledge at least; no one has ever encountered proof of a pardox existing). Logic is sopposed to describe the real world. Could there be some sort of flaw in our logic then :S?
Short answer: Logic is not a set of laws which govern the universe.
 
  • #5


Originally posted by Yahweh
Short answer: Logic is not a set of laws which govern the universe.

Well, you're right, of course, but what of the fact that logic is supposed to be a prescription for the Universe (anyone who can catch the intended joke here has my admiration)? If Logic shows what the Universe "should be" like, and yet it (the Universe) has no paradoxes, then Logic is doing a poor job of prescribing, isn't it?
 
  • #6
Originally posted by Sikz
Paradoxes exist in our logic. They do not exist in the real world (to our knowledge at least; no one has ever encountered proof of a pardox existing).

What? Have you never met a teenage girl?
 
  • #7
Paradox means two different things.

1. Paradox means defiance of accepted thought. The antonym of this kind of paradox is "orthodox". For example: it was long considered axiomatic that a whole entity must be greater in every way than any proper part of the entity. But the theory of transfinite sets produced a paradox that shows that the even part of the whole numbers can be mapped into an exact one-to-one correspondence with the whole set of odd and even numbers. Of course, as sets, the subset of even numbers is still properly smaller than the set of all numbers. But in at least one respect, one-to-one association, the two are equivalent. Since the acceptance of this paradox, it has been understood that this is a defining character of the transfinite.

2. Paradox means logical self-defeat. This is probably what you have in mind using the word 'paradox". A synonym that specializes this meaning is "antinomy", an outlaw conceptual entity. A famous example in the theory of transfinite sets in the set of all sets. logicians and mathematicians have learned strategies for dealing with these outlaws when they arise and avoiding their antinomous behavior. The set of all sets is a kind of class, but it is not allowed to be a member of another class.

Not all antinomous paradoxes are from set theory. Many come from troubles in semantics. Here is an ancient example:

A: Mr. X is bald. This statement should be clearly true or false.
B: Agreed.
A: First I present Mr. X with a full, lush head of hair growing out of his scalp. Is he bald?
B: No.
A: Now I cut one hair follicle off Mr. X's head. Is he now bald?
B: No.
A: Now I cut another hair off Mr. X's head. Is he now bald?
B: No.
...
A: Each time I cut one hair off Mr. X's head, it does not change the status of his baldness.
B: Correct.
A: Therefore, if I continue cutting his hair this way, he will never become bald.

This is an example of vagueness at work.
 
  • #8


Originally posted by Mentat
Well, you're right, of course, but what of the fact that logic is supposed to be a prescription for the Universe (anyone who can catch the intended joke here has my admiration)? If Logic shows what the Universe "should be" like, and yet it (the Universe) has no paradoxes, then Logic is doing a poor job of prescribing, isn't it?

But that's like saying that since language is supposed to describe the universe, anything that you can state using language must therefore exist within the universe.

Logic is a set of rules that tell us how reason is supposed to work in the universe. That doesn't mean that just because we can describe something with logic that the "something" must manifest itself within the universe.


Also, I don't know of any paradoxes of logic itself. The only paradoxes that I know of are ones where you assert something is true and then use logic and the assertion to derive a contradiction (a paradox). So the paradox occurs because of the assertion, rather than just logic itself.
 
  • #9


Originally posted by Mentat
Well, you're right, of course, but what of the fact that logic is supposed to be a prescription for the Universe (anyone who can catch the intended joke here has my admiration)? If Logic shows what the Universe "should be" like, and yet it (the Universe) has no paradoxes, then Logic is doing a poor job of prescribing, isn't it?
Paradoxes certainly exist in the universe. It takes a bit of preperation, but any engineer or statistician is familiar with Simpson's Paradox (that link describes how a datatable can be created from legitimate study to demonstrate how those with no education in Physics perform better on Physics tests... the paradox is obvious, though the conditions which create the paradox tend to fool most people).

Other paradoxes include the familiar Liar's Paradox: This sentence is false.

Another paradox is the Birthday Paradox: If there are 23 people in the room, there is a 50/50 chance that two of them have the same birthday.

Theirs no problem in the logic. Its important to keep in mind the definition of a paradox: A paradox is an apparently true statement that seems to lead to a logical self-contradiction, or to a situation that contradicts common intuition. Not all paradoxes imply a logical contradiction.

On a note of logical contradiction and paradoxes, here is one paradox which does creates an apparent logical contradiction: Considering the concept of omniscience, you might ask "if something knows all there is to know, then that something must know something which it doesn't know". That statement creates a paradox. In the case of omniscience, the particular "know what you do not know" demonstrates the incoherency of omniscience. (Most other prefixes that start with the word "omni" to describe things - especially deities - create similar contradictions.)

(Here is a whole list of popular paradoxes: Wikipedia - Paradox)
 
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  • #10


Originally posted by Yahweh

Theirs no problem in the logic. Its important to keep in mind the definition of a paradox: A paradox is an apparently true statement that seems to lead to a logical self-contradiction, or to a situation that contradicts common intuition. Not all paradoxes imply a logical contradiction.

So, simply put, that's a statement for which you can not determine whether its true or false?
 
  • #11
Words only have demonstrable meaning according to their function in a given context. To the layperson, paradox can mean anything from a simple contradiction to an apparently insoluable puzzle. To the mathematician and logician, the word has a much more specific meaning. Hence, your assertion that paradoxes do not exist in the real world is meaningless mumbo-jumbo without a clear definition of what you mean by paradox.
 
  • #12
Sikz said:
Paradoxes exist in our logic. They do not exist in the real world (to our knowledge at least; no one has ever encountered proof of a pardox existing). Logic is sopposed to describe the real world. Could there be some sort of flaw in our logic then :S?

There is no inconsistency in the statements, "paradoxes exist in logic", "logic describes the real world", and "paradoxes exist in the real world". That is because the paradoxes of logic only arise when statements are self-referential or vague, not when they describe the observable universe.
 
  • #13
"
This dog is mine.
This dog had puppies.
So, this dog is a mother.
This dog is mine and this dog is a mother.
Therefore, this dog is my mother.
"
:smile:
 
  • #14
quartodeciman said:
"
This dog is mine.
This dog had puppies.
So, this dog is a mother.
This dog is mine and this dog is a mother.
Therefore, this dog is my mother.
"
:smile:

:rofl: :rofl: :rofl:

Very funny, but that's a fallacy, not a paradox.
 
  • #15
There is a possiblity that paradoxes could exist in our physical world. Many of these are predicted by physics theorems and models. For example, a branch of superstring theory suggests that if a spaceship were traveling at just the right velocity very close to a position where two superstrings(very dense 'strings' that cruise around the universe at high speeds) crossed each other, the intense gravity would pull the path of the spaceship into a tight enough loop that the acceleration would cause it to arrive before it left. Now here's the real question:

If the spaceship arrives before it leaves, does it hit itself?

If so, it would produce a physical paradox, as indeed many time-travel situations do. Scientists are divided on what such a paradox would 'do'. Some believe it would destroy the universe, but that's rather out of a melodramatic constitution than out of any real science in my opinion. A popular opinion which possibly finds its roots in sci-fi is that it would 'rip the fabric of time-space' but this positin is also scientifically unfounded. We simply don't know what would happen.

Hope that helps,
jeffceth
 
  • #16
jeffceth said:
There is a possiblity that paradoxes could exist in our physical world. Many of these are predicted by physics theorems and models.

But models are only that: models. They have no efficacy in the real world. And if a theoretical physicist were to come up with something that predicted a paradoxical effect, then the theory would most likely be modified or rejected on that basis. For instance noninteger values of the quantum number l are rejected as they lead to two different wavefunctions corresponding to the same quantum state (which would be paradoxical). Similarly, periodic boundary conditions are imposed on angular wavefunctions specifically to avoid multiply-valued wavefunctions (which would also be paradoxical).

When we encounter a paradox in theoretical physics, I think it should be viewed as a giant neon sign that says, "You are making a mistake!"
 
  • #17
Tom Mattson said:
When we encounter a paradox in theoretical physics, I think it should be viewed as a giant neon sign that says, "You are making a mistake!"

Or your context is too vague.

For example, I could assert that life, the universe, and everything is ultimately paradoxical. However, such is the realm of philosophy rather than physics. The context is simply too broad and vague to have any demonstrable meaning in the context of physics.
 
  • #18
Tom Mattson said:
When we encounter a paradox in theoretical physics, I think it should be viewed as a giant neon sign that says, "You are making a mistake!"

Yes, and when we come up against a paradox through reasoning, the same neon sign should be flashing. Or if one is reasoning correctly maybe the sign could say something like, "You are reasoning without all the information you need to resolve what merely appears to be a paradox."
 
  • #19
wuliheron said:
For example, I could assert that life, the universe, and everything is ultimately paradoxical. However, such is the realm of philosophy rather than physics. The context is simply too broad and vague to have any demonstrable meaning in the context of physics.

I don't see any way you could seriously assert that everything is paradoxical. I can name plenty of things that are not.
 
  • #20
loseyourname said:
I don't see any way you could seriously assert that everything is paradoxical. I can name plenty of things that are not.

Exactly my point, you can name plenty of things that are apparently not paradoxical and I could name plenty that are. For all either of us can prove life, the universe, and everything is ultimately ineffable. Without providing a specific context there is no way to meaningfully discuss the issue. Merely asserting that plenty of things are or are not apparently paradoxical proves nothing about the big picture.
 
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  • #21
wuliheron said:
Without providing a specific context there is no way to meaningfully discuss the issue.

But the specific context was provided in the opening post. The comparison is being drawn between formal logic, which has inherent paradoxes, and the observable universe, in which the law of excluded middle seems to never be violated. The question is, given that, how can we say that logic corresponds in any way to the universe.

I don't see what your point is.
 
  • #22
There are (at least) two types of paradox:

1. consequences that seem to violate accepted presuppositions

2. consequences that are antinomous (direct contradictions)

.

The answer to the 1 type might be to change those presuppositions (e.g. nature of infinite sets);
the answer to the 2 type might be to acquire some kind of insurance (e.g. set of all sets);
.

(Logic, as a science, must watch its own back. Some limits and restrictions might be in order. Just exactly what needs to be done for safety may remain a longterm problem.)
 
  • #23
Tom Mattson said:
But the specific context was provided in the opening post. The comparison is being drawn between formal logic, which has inherent paradoxes, and the observable universe, in which the law of excluded middle seems to never be violated. The question is, given that, how can we say that logic corresponds in any way to the universe.

I don't see what your point is.

Ahhh, I see what you mean. Here is the original post again.

Paradoxes exist in our logic. They do not exist in the real world (to our knowledge at least; no one has ever encountered proof of a pardox existing). Logic is sopposed to describe the real world. Could there be some sort of flaw in our logic then :S?

This is a nonsensical statement by all the standards of logic. Paradoxes have no truth value whatsoever according to traditional formal logic. However, some types of formal logics, especially extentions of fuzzy logic, give them a truth value of "indeterminate" (note: much like QM.)

In addition, you cannot prove or disprove a negative. You cannot prove paradoxes do not exist any more than you can prove angels do not dance on the heads of pins. Thus, by the standards of formal logic it is impossible to prove or disprove the existence of a paradox in the real world. All we can do is note what is apparently paradoxical, and look for resolutions.

This is similar to the EPR thought experiment. Einstein, Podolsky, and Rosen could not prove paradoxes were impossible, but they could point out that QM is apparently inherently paradoxical and just how ridiculous that sounded. Likewise, I would add, it is equally ridiculous (paradoxical?) to insist everything must have some sort of rational explanation.

For all these reasons, the statement has no meaningful context. Given a specific context, then something meaningful can be said on the subject.
 
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  • #24
wuliheron said:
This is a nonsensical statement by all the standards of logic.

It's not nonsensical at all. Sikz made an observation about a property of logic which is well understood, and then made another observation that that same property is not evinced by any observational data. The question is then, "Is logic appropriate for describing the universe?"

I think he's misunderstanding things, for the reason I stated, but the question is perfectly intelligible.

Paradoxes have no truth value whatsoever according to traditional formal logic. However, some types of formal logics, especially extentions of fuzzy logic, give them a truth value of "indeterminate" (note: much like QM.)

But those fuzzy logics only describe quantum mechanical systems inbetween measurements. Make a measurement, and QM predicts no violation of the law of excluded middle. You will find that electron at precisely one location, not two.

In addition, you cannot prove or disprove a negative. You cannot prove paradoxes do not exist any more than you can prove angels do not dance on the heads of pins. Thus, by the standards of formal logic it is impossible to prove or disprove the existence of a paradox in the real world. All we can do is note what is apparently paradoxical, and look for resolutions.

This was acknowledged in the first post.

This is similar to the EPR thought experiment. Einstein, Podolsky, and Rosen could not prove paradoxes were impossible, but they could point out that QM is apparently inherently paradoxical and just how ridiculous that sounded.

"Sounding ridiculous" is not the same as "being inherently paradoxical".

Likewise, I would add, it is equally ridiculous (paradoxical?) to insist everything must have some sort of rational explanation.

What's this got to do with the question that Sikz asked?

For all these reasons, the statement has no meaningful context. Given a specific context, then something meaningful can be said on the subject.

Well, the first post has a perfectly meaningful context, whether you recognize it or not. The idea that logical paradoxes exist, while physical paradoxes have not been observed, is well-defined enough for anyone to be able to understand it.
 
  • #25
Tom Mattson said:
Well, the first post has a perfectly meaningful context, whether you recognize it or not. The idea that logical paradoxes exist, while physical paradoxes have not been observed, is well-defined enough for anyone to be able to understand it.

Sorry, but this boy can not understand the statement. I will try to make myself as clear as possible.

As far as I can tell, it is either too vague to be intelligable or downright paradoxical. Logic without paradox is like up without down, patently impossible. To then say that logic describes everything we observe, but we have never observed a paradox is a contradiction.

There are two rudamentary types of paradoxes, the Heap paradox and the Liars paradox. The liars paradox is more substantiated by the rules of logic, while the heap paradox is more applicable to linguistics and concerns the vagueness of statements. Because we are talking about the "real" world, it is the heap paradox with it's emphasis on vagueness and linguistics that takes precident.

Again, words only have demonstrable meaning according to their function in a given context. Natural language is repleat with vague terms while logistics are not. Mixing the two then requires a great deal of care in order to maintain coherency. :tongue2:
 
  • #26
wuliheron said:
As far as I can tell, it is either too vague to be intelligable or downright paradoxical. Logic without paradox is like up without down, patently impossible. To then say that logic describes everything we observe, but we have never observed a paradox is a contradiction.

But he's not saying that logic describes everything we observe. He was asking if it is right to use logic to describe what we observe, given the presence of paradoxes in logic and the absence of paradoxes in observations.

There are two rudamentary types of paradoxes, the Heap paradox and the Liars paradox. The liars paradox is more substantiated by the rules of logic, while the heap paradox is more applicable to linguistics and concerns the vagueness of statements. Because we are talking about the "real" world, it is the heap paradox with it's emphasis on vagueness and linguistics that takes precident.

I agree. My answer to Sikz was that the formal type of paradox (the "liar" type) should not concern us, because it only arises when statements refer to themselves. But when we use logical reasoning to describe the world, there is no danger in running into that sort because the statements refer to physical objects and processes. So this reduces the problem of, "Is logic appropriate for describing a non-paradoxical world?" to the question of, "Can we formulate nonvague physical theories, thereby circumventing the second type of paradox?"

I hope you can see that your ability to articulate the problem means that it is decidedly not nonsensical. If it were unintelligble, you wouldn't be able to make heads or tails of it.
 
  • #27
Tom Mattson said:
But he's not saying that logic describes everything we observe. He was asking if it is right to use logic to describe what we observe, given the presence of paradoxes in logic and the absence of paradoxes in observations.

I agree. My answer to Sikz was that the formal type of paradox (the "liar" type) should not concern us, because it only arises when statements refer to themselves. But when we use logical reasoning to describe the world, there is no danger in running into that sort because the statements refer to physical objects and processes. So this reduces the problem of, "Is logic appropriate for describing a non-paradoxical world?" to the question of, "Can we formulate nonvague physical theories, thereby circumventing the second type of paradox?"

I hope you can see that your ability to articulate the problem means that it is decidedly not nonsensical. If it were unintelligble, you wouldn't be able to make heads or tails of it.

I don't know if that is his question at all, again, because he has not provided a specific context. Here is his original question again:

Sikz said:
Paradoxes exist in our logic. They do not exist in the real world (to our knowledge at least; no one has ever encountered proof of a pardox existing). Logic is sopposed to describe the real world. Could there be some sort of flaw in our logic then :S?

First off, paradoxes do exist in the real world as far as we know. As I have already pointed out, the EPR experiment is one of the more famous proofs that the most successful physical theory ever is apparently paradoxical. Secondly, as I already pointed out, it is impossible to prove a paradox exists! Paradoxes do not have truth values and the proof he is talking about is I assume a logical proof!

Thus, the only conclusion I can draw is that he is speaking from a logically biased position, or he is speaking in paradoxes. Which it is I have no real clue.
 
  • #28
wuliheron said:
First off, paradoxes do exist in the real world as far as we know. As I have already pointed out, the EPR experiment is one of the more famous proofs that the most successful physical theory ever is apparently paradoxical. Secondly, as I already pointed out, it is impossible to prove a paradox exists! Paradoxes do not have truth values and the proof he is talking about is I assume a logical proof!

Thus, the only conclusion I can draw is that he is speaking from a logically biased position, or he is speaking in paradoxes. Which it is I have no real clue.

I believe what Sikz has pointed to borders on profound. I'll try to explain.

He has noticed there are no confirmed paradoxes in the real world;that is, we cannot observe them. Before the so-called "EPR paradox" were the position-momentum paradox, the wave-particle paradox, and then, as you've pointed out, the liar's and heap paradoxes, and so on. But what is creating the paradox? I say what happens every time, without exception, is that our logic is confounded by our experience. Because of that Sikz asks if there is a flaw in our logic. I don't think so at all, and because there isn't, the implications could be profound.

Logic is grounded in math, and math symbolically represents the order and structure of physical processes and objects. The logic of a situation is completely different than the experience of a situation, so it is very clear that experience is not logic. Logic is a process of our computing mind, experience is a subjective element of conscious existence, and therein lies the confusion. We can experience reality, but it is impossible to represent all of it with math/logic. There are aspects of reality which appear distinct from other aspects, and so lend themselves to logic. But there are also aspects which are holistic, continuous, homogeneous and seemingly impossible to pull out of the whole . . . If something cannot be segmented, logic alone is going to miss it.

Back to the question of profundity and paradox. The paradox proves that "mind" (mentality) does not expose the whole of reality to us, but merely a framework. The paradox often arises when homogeneity and "parts" are put at odds mentally. Because it can't be resolved mentally/logically, we call it a paradox until, that is, we find a way to experience a situation and realize the overall thing that's going on. When that happens, something that was impossible to accept logically, like wave-particle duality, suddenly is accepted when we understand that EM is both wave and particle (in that instance, wave is the homogeneous aspect and particle is the "part" aspect). So, there is no paradox in the real world, just as Sikz says, only mental confusion.

I like this problem because I believe it demonstrates how easily we geniuses can be "in our minds." That is, to get so caught up in trying to think our way to the truth that we forget to experientially participate in life the way we need to in order to truly know reality.
 
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  • #29
wuliheron said:
I don't know if that is his question at all, again, because he has not provided a specific context. Here is his original question again:

What exactly are you looking for here in the way of a "specific context"? He's talking about formal logic on the one hand, and observational evidence on the other. It doesn't get any more well-defined than that.

First off, paradoxes do exist in the real world as far as we know.

That doesn't matter. The question is as to whether or not logic is an appropriate tool for describing what we observe, if we don't observe paradoxes. They may exist, but they aren't observed. And as you note later, they can't be observed--and that only makes the question more relevant, because they are observed in logic.

As I have already pointed out, the EPR experiment is one of the more famous proofs that the most successful physical theory ever is apparently paradoxical.

This is not relevant. EPR is not a real experiment, but a thought experiment, which places it on the "logic" side of the "logic-reality" dichotomy.

Secondly, as I already pointed out, it is impossible to prove a paradox exists! Paradoxes do not have truth values and the proof he is talking about is I assume a logical proof!

No, he's not talking about a logical proof at all. As I have already said, he's asking if logic is an appropriate tool for describing the real world, when paradox is manifest in the former and not in the latter. The point you raise here (that paradoxes can't be observed even in principle) only makes that question more pertinent: How can a formal system that manifestly exhibits this feature called "paradox" be an apt tool for modeling a physical reality that cannot exhibit such a feature?
 
  • #30
Once again with emphasis, neither logic nor observation can prove or disprove the existence of paradoxes! Paradoxes have no truth value in logic and unless you are talking about some kind of meaningful emotional experience as observational proof, there is no way to prove paradoxes exist in the world either.

What all of you are dancing around is what Wittgenstein described, and he is widely considered perhaps the most profound philosopher of the last century. He said there are facts and the mystical. Facts such as the world being round can be spoken of coherently, but there is nothing that can said about the mystical coherently. It does not matter whether or not the mystical actually exists, the point is simply that if it really is mystical nothing coherent can be said on the subject.

As a Taoist myself, the whole point is moot in much the same fashion as Wittgenstein proposed. What matters is being accepting, open minded, and flexible. Logic can either be a straight jacket or a wonderful tool. Don't confuse the tool with the reality, that is my advice.

Tools

Thirty spokes meet at a nave;
Because of the hole we may use the wheel.
Clay is moulded into a vessel;
Because of the hollow we may use the cup.
Walls are built around a hearth;
Because of the doors we may use the house.
Thus tools come from what exists,
But use from what does not.
 
  • #31
wuliheron said:
Once again with emphasis, neither logic nor observation can prove or disprove the existence of paradoxes!

Once agan with emphasis, that is not the question at hand!

The question goes to the appropriateness of logic in describing the world. It's not about proving or disproving the existence of paradoxes in the world.

Paradoxes have no truth value in logic and unless you are talking about some kind of meaningful emotional experience as observational proof, there is no way to prove paradoxes exist in the world either.

You already covered that, and I pointed out that this point actually highlights the apparent incongruity between logic and the universe. Whether or not paradoxes exist in the real world, you can't observe one, even in principle. But you can demonstrate paradoxes with logic. Thus, there is some feature of formal logic that does not map onto observation, hence the question.
 
  • #32
Tom Mattson said:
Once agan with emphasis, that is not the question at hand!

The question goes to the appropriateness of logic in describing the world. It's not about proving or disproving the existence of paradoxes in the world.

You already covered that, and I pointed out that this point actually highlights the apparent incongruity between logic and the universe. Whether or not paradoxes exist in the real world, you can't observe one, even in principle. But you can demonstrate paradoxes with logic. Thus, there is some feature of formal logic that does not map onto observation, hence the question.

The idea that you cannot observe a paradox, even in principle, is merely a biased idea, not necessarilly the reality we live with. Again, you cannot use logic to prove or disprove anything about the ultimate nature of reality. Logic is merely a tool used to help us describe reality, not to be confused with reality itself. I no more expect logic to describe everything than I expect music or numbers to describe everything. Each tool has specific applications for which they are extremely useful, but by definition they have their limits.

From my own point of view, existence itself is apparently a paradox we live with everyday. Why is there something rather than nothing? What is the cause of existence? Any answer you might propose involves a paradox. In fact, the vast majority of humanity believes in paradoxes, such as the belief in God(s) and Divinities.

I observe paradox not only in existence in the broader sense, but in my own emotional life as well. Because of my emotional life, I can apply meaning to things such as paradoxes, logic, and this discussion we are having. Although my desktop computer can execute perfectly logical operations, it cannot apply meaning to things and, at its best, acts like an idiot savant. Ironically, because I am irrational I can be more rational. :tongue2:
 
  • #33
wuliheron said:
The idea that you cannot observe a paradox, even in principle, is merely a biased idea, not necessarilly the reality we live with.

OK, fine. It wasn't my idea anyway, it was yours. I was merely conceding the point because you are difficult enough! :rofl:
 
  • #34
My idea was that it is impossible to prove an observation of a paradox, not that it is impossible to observe a paradox.

I'm sorry if this discussion seems difficult to you, it is actually a conceptually simple subject. However, my approach does differ dramatically from traditional western approaches to the subject. Both asian philosophy and modern contextualism have proven more adept at dealing with such slippery concepts outside the boundaries of formal logic.
 
  • #35
Years ago I lived in Riverside, California and on occasion worked in Los Angeles, about 50-60 miles. If I left for home immediately after getting off work at 5 I would not get home until around 8. If I waited until 6 before starting to drive home I got home around 7. I've often wondered where I would have passed myself and why if I could pass myself why was I driving so slow when I left at five and so fast when I left at 6 that I could pass myself. This is to me a paradox that existed in the real world and in my life.
It was not just a failure or limitation of our language or thought processes, logic, but a reality that repeated itself over and over without fail.
 

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