iQuestor wrote:This is a perfect example of what I am trying to say. The different readings on the clocks is not a paradox, unless you do not understand frame dragging or time dilation. We weren't wrong about the readings on the clocks, we were wrong in assuming they would agree -- why did they read different? That doesn't make sense! We would expect the same reading because we thought space and time were completely separate, but they are not. We were wrong in our understanding of the Laws of the Universe, in this case, General Relativity. Against Human Logic, Time slows with greater speed, and is relative to space and matter. Hence Einstein's GTR.
Nooo . . . this is a perfect example of what
I'm trying to say.
As I said above, I think we may have different definitions of the word, "paradox," and it is precisely due to this difference that the disagreement in our beliefs about paradox arises.
You seem to think paradox means something "impossible, inexplicable, and contradictory," like a square circle. A square circle isn't a paradox--it's nonsense. Literally, it doesn't make any sense. The concept itself represents a juxtoposition of ideas which can never exist together (not even in the imagination). The same thing goes for Zeno's paradoxes. They aren't really paradoxes, because the "impossible, inexplicable, and contradictory" nature of motion --which his "paradoxes" supposedly illustrates--is brought on by framing the problem of motion in a nonsensical manner.
Therefore, if you're going to
define paradox in such a way,
of course you are going to believe there is no such thing as paradox, because you are begging the question. In other words,
of course you are going to dismiss all my examples, claiming they aren't really paradoxes, because you've already got a built-in bias against paradox existing in the first place. Because you think paradox means "impossible, inexplicable, and contradictory," when I give examples that exist, are explainable, and don't contradict logic, you dismiss them and claim they're not really paradox. As soon as an explanation is presented (such as Einstein's GTR), you think that the paradox disappears because it has been explained.
Obviously, I think your definition is wrong. Paradox, I believe, is better characterized as, "two conflicting perspectives which are--despite their opposition--both true, real, and valid." I believe this definition fits the subject matter at hand, too: Covenant's paradox. The paradox of the white gold (and indeed the First Chronicles) is illustrated by the marrowmeld sculpture that looks like both Bannor and Covenant. It is both rigid control and extravagant power--two conflicting principles which are nevertheless inextricably tied.
In the GI, Donaldson said:
"Mhoram learned to find his own version of "the eye of the paradox": the point where both passion and control can be affirmed . . . Blake wrote, "Reason is the circumference of energy." Gichin Funakoshi wrote, "If your hand goes forth, withhold your anger. If your anger goes forth, withhold your hand." Someone (I've forgotten who) wrote, "Beauty is controlled passion." Mhoram learned to understand this. The fatal flaw of the Haruchai (and of Atiaran, and of Trell, and of Troy, and of the Unhomed, and of Kevin--and of Covenant early on) is that they did not."
(11/24/2004)
Again:
"I like to credit William Blake, who wrote, "Reason is the circumference of energy." This struck me when I first read it, and still strikes me today, as an ideal expression of the paradox which makes art, beauty, and even humanity possible. If energy (chaos) is not controlled by reason (order), it remains formless and destructive. If reason is not constantly challenged and stretched by energy, it remains rigid and destructive.
(06/01/2005)
Are you saying that Donaldson is wrong, that his insights aren't really paradoxical? [Note, I'm not using the argument by authority fallacy, I'm just trying to push this back on topic. I'm curious about your take on the control/passion paradox--or the chaos/order paradox, for that mattrer.]
iQuestor wrote:Frame dragging, black holes, and bumblebees having the ability to fly despite fat bodies and stubby wings. These are all paradoxes or mysteries that we have (possibly) unravelled through our experiments. At one time, we dismissed these ideas, and said they were wrong or couldn't exist or didnt make sense. The real issue here is that Human logic was wrong. Once we understood a little more about the universe, then we could resolve these seeming paradoxes.
"
Seeming paradox." Bingo. A bumblebee flying is not really a paradox. Therefore, disproving the apparently paradoxical nature of bumblebee flight DOES NOT disprove the existence of paradox. It merely illustrates (again) how you think paradox means, "something inexplicable." Paradox was never intended to mean "something we can't explain."
While this next subject doesn't really deal with paradox, let me take it bit-by-bit, because it is exceedingly complex.
iQuestor wrote:You have misunderstood me here I think. I fully agree that logic and math are universal in that they are the Laws that the Universe is governed by;
No, no, and again no. The universe is NOT governed by math and logic. The universe exhibits properties that can be quantified in mathematical models. However, these mathematical models do not govern or dictate the universe. There is no logical principle which forces the universe to conform to ANY mathematical order. Indeed, the bare fact that the universe DOES seem to conform to a mathematical order is a complete mystery. We don't know if it appears this way to us because we impose the filter of consciousness upon all our dealings with the universe, or if it is one of the most unlikely accidents imaginable. One version of the anthropic principle theorizes that there are numerous universes, and it just so happens that the freaky universe that is so delicately balanced to conform to mathematical models is precisely the kind of universe in which conscious, intelligent beings have a chance to come into being to ponder this mysterious correspondence.
So, what I mean about math and logic being universal is that they are not subjective. They are not dependent upon individual insights, nor are they like opinions which can be "true" for one person but not for another person. My math is the same as your math. My "number 3" is the same exact "number 3" which you understand. Math is universal, but it doesn't govern the universe. [David Hume's and Edmond Husserl's writings are invaluable resources for these subjects, if you want to delve deeper.]
iQuestor wrote: . . . I merely relate that human logic and human math are not perfected yet and not completely in tune with reality, and that when we attempt to describe the universe with our faulty logic and math, the things that don't fit in our understanding are called paradoxes.
I really have no idea what you're describing in this context with the qualifier, "human." Math is math. The amount we have formulated or discovered isn't significantly different from what we will formulate or discover later. Our math and logic isn't "faulty." Maybe "incomplete" is a better word. However, paradox isn't a description of the universe using incomplete math, nor is it a phenomenon which resists our understanding--as I've said above. You're arguing with a "faulty" definition.
iQuestor wrote:When I say Human math, I mean what we understand of it. Yes we have 2+2 down pat, but no one is debating that. But we don't have Quantum physics all the way down, or string theory, or many others. You seem to assume Human logic and the human grasp of mathematics is perfect and complete on a universal basis. they are not. If they were, we'd understand the universe, and complete understanding means no paradoxes!!
Quantum physics, string theory, etc. are not examples of math or logic. This is why I'm confused about your definition of "human math." These are examples of theories to explain the world. True, they are incomplete. But showing their incompleteness doesn't prove anything at all about math/logic, because they are not examples of math/logic. This seems to be a common technique you use in your argument: equivocation.
iQuestor wrote:why do you think it is the Theory of General Relativity, and not the Law of General Relativity? it is because we don't know for sure that it will hold up in all cases, only in what we have observed so far. We can't prove it.
This is true for every theory. At no point is a theory ever elevated to the status of Law. This is due to the problem of induction (more Hume). Every single scientific theory relies upon inductive reasoning, i.e. using isolated examples as empirical evidence to "back up" a general principle. But no amount of individual examples can ever completely prove a general principle. There are no Laws of Physics. Only theories. And, due to the problem induction, there never will be any Laws of Physics. This is not merely a limit of "human logic," it is the nature of subjective selves living in a universe. It's not a "fault." It's simply the way our existence
is, and will always be.
So this leaves us with an interesting conclusion (if anyone is still reading). If, as you say, "apparent paradox" really is a
temporarily inexplicable phenomenon . . . then what's the status of "paradox" once you realize that the universe is fundamentally, permanently beyond explanation? If, as you say, theories aren't laws, and we can never be sure that our theories are absolutely true, then how can you possibly say that any paradox is
ever explained?
Even by your own definition, paradox is an essential feature of our existence in this universe, because our existence is fundamentally limited in such a way that we will never fully explain it. There are no Laws, only theories.
What I am saying is that there is logic to the universe. It has nothing to do with human perception or human logic. It is governed by some set of laws that we do not fully understand. Lets call it god-logic for lack of a better term.
We can't possibly know if there is "logic to the universe." All we can ever know is that
this is how it looks to us. Logic and math are systems we use to
model the universe. The apparent correspondance between logic and the universe is a contingent curiousity. Your
theory that the universe is governed by some underlying logic can never be proven; there may be some pocket of the universe that violates logic and math completely. How do you know?
Logic and math are ideal, abstract systems of thought.
What's the connection between an ideal, abstract "object" and a physical entity? How can abstract, ideal "objects" connect with physical entities at all? I smell a paradox . . .
iQuestor wrote:When (if) we understand the universe through the perspective of god-logic, then my position is there will be no paradoxes; it would make perfect sense from that perspective.
Again, this sounds like religious mysticism--and not because you use the word "god." It's because you hold beliefs about math which can't possibly be proven (we call that "faith"). You are arguing with the false assumption that because something is demonstrably incomlete, that on some level it exists in a complete form. That's like saying that even though numbers are infinite, there's a "god-view" from which you can see them all. That's a nonsensical belief; it does not make sense. In fact, due to Godel's proof, math and logic are
intrinsically incomplete, and they always will be, even if our intelligence were infinite. All there is is "human logic."
we dotn yet have a universal theory of everything.
How would we know when we had it? Even if we had one, it would still be "just a theory."
If there is a God, and his math says 2 + 2 = 1, then we are obviously wrong in our understanding of Math.
I wouldn't say that we were wrong, just that God was testing us.
At any rate this is my own idea. I obviously have no evidence. it is based on my assumption that the universe follows some law, be it natural or created. (I think when you say Logic and Math are universal, you also mean this.)
Yes, you have no evidence. Yes, it is based on an unprovable assumption. And, no, that's not what I mean by "Logic and Math are universal."
Whew!
