If infinite sets and brutely distinguishable elements exist, infinite sets with brutely distinguishable elements should exist.
Why? It doesn't follow. (As a trivial case, imagine that there are only two brutely distinguishable things in the world.) (Assuming that by "infinite sets with brutely distinguishable elements" you mean "set with infinitely many b.d. elements".)
Also, you say that sets are distinguishable whenever there is a predicate which applies to one and doesn't apply to another. That is, X and Y are distinguishable iff for some P, P(X) and not P(Y). Right?
But then you argue as if the only allowed predicates were those about cardinality. To closely follow your example, let's denote X = "the former set containing infinitely many b.d. points" and Y = "the latter set containing all those points plus the additional one which 'popped into existence'". Then we have a predicate P(Z) = "Z is a subset of X", and P(X) holds while P(Y) doesn't. What's wrong here?
Are my aesthetics off? [...] Perhaps its a status thing, as the research journals don't use it.
Your aesthetics are incompatible with most of the readers. You've got quite a lot of negative responses to your formatting, not a single positive response (correct me if I am wrong), yet you still persist and speculate about status reasons. Even if it were true, I'd suggest taking the readers' preferences more seriously, if you want the readers take you more seriously.
To me, coloured text really doesn't seem more legible than bold or italics. Moreover I like when a website has a unified colour scheme which your colours break. All violations of local arbitrary design norms are distracting; the posts aren't art, therefore aesthetics shouldn't trump practical considerations. But if you really that much insist on using colours for emphasis (but consider there may be colourblind people reading this), please at least use the same font and background colour as everybody else.
You've got quite a lot of negative responses to your formatting, not a single positive response (correct me if I am wrong), yet you still persist and speculate about status reasons.
I just found it curious: I've addressed typography issues in a blog posting, "Emphasis by Typography."
I have to say I'm surprised by your tone; like you're accusing me of some form of immorality for not being attentive to readers. This all strikes me as very curious. I read Hanson's blog and so have gotten attuned to status issues. I'm not plotting a revolution ove...
[Crossposted]
Initially attracted to Less Wrong by Eliezer Yudkowsky's intellectual boldness in his "infinite-sets atheism," I've waited patiently to discover its rationale. Sometimes it's said that our "intuitions" speak for infinity or against, but how could one, in a Kahneman-appropriate manner, arrive at intuitions about whether the cosmos is infinite? Intuitions about infinite sets might arise from an analysis of the concept of actually realized infinities. This is a distinctively philosophical form of analysis and one somewhat alien to Less Wrong, but it may be the only way to gain purchase on this neglected question. I'm by no means certain of my reasoning; I certainly don't think I've settled the issue. But for reasons I discuss in this skeletal argument, the conceptual—as opposed to the scientific or mathematical—analysis of "actually realized infinities" has been largely avoided, and I hope to help begin a necessary discussion.
1. The actuality of infinity is a paramount metaphysical issue.
2. The principle of the identity of indistinguishables applies to physics and to sets, not to everything conceivable.
3. Arguments against actually existing infinite sets.
A. Argument based on brute distinguishability.
B. Argument based on probability as limiting relative frequency.
4. The nonexistence of actually realized infinite sets and the principle of the identity of indistinguishable sets together imply the Gold model of the cosmos.