# Multiple levels of infinity [closed]

Some programmers don't see much relevance in theoretical CS classes (especially my students). Here is something I find very relevant. Let me build it up in pieces for those that haven't seen it before...

A) Programming problems can be reworded to be questions about languages.

B) Turing machines recognize languages.

C) Turing machines can be encoded as (large) integers.

D) Therefore, the number of possible Turing machines are countably infinite

E) The power set of a set is just all the possible subsets of that set.

F) If a set is countably infinite, its power set is bigger, ie, uncountably infinite.

G) Therefore, if a language is infinite, it has an uncountably infinite number of subsets. Each of these represents a problem. But there are only countably many Turing machines with which to solve those problems. And if we cannot solve a problem with a Turing machine, it cannot be solved.

Conclusion...we can only solve an infinitesmally small fraction of all problems.

My question is almost here...

Whenever I present this argument to students, they get stuck on the countably vs. uncountably infinite. They generally do not have strong math backgrounds, so attempts to explain via Cantor's diagonalization argument tends to glaze their eyes.

Usually I try to give them somthing they can grasp, like this...place a finite box over any portion of the counting number line, and we capture a finite quantity of those numbers...but place a finite box over any portion of the real number line, and we capture an infinite quantity of real numbers. A sort of evidence that there ARE more real numbers than there are counting numbers.

Finally my question...How do YOU explain the concept of multiple levels of infinity to those that have never heard of the concept, and may not be mathematically inclined?

Final Edit: I learned a lot by asking this question and I appreciate the feedback. I wasted far too much time trying to figure out what "Community wiki" actually was. I learned there is an inherent bias in some people against theory questions that I feel is simply a mistake because so much of what we do today was theory yesterday. But this bias is natural and while I disagree with them on the value of theory, I have no problem with it, and it helps me understand where my students are coming from. I do think the BS comment was unnecessary.

I do not feel this question was a poll or a preditions-for-2009 question at all. Those of you that only want coding questions with coding answers might want to re-examine that requirement. I have moved this question to community wiki but strongly feel I was compelled to do so by improper use of force.

## closed as off topic by paxdiablo, Michael, Matthew Flaschen, Steven A. Lowe, RobJun 16 '09 at 17:00

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• I suppose I should research "community wiki", but respectfully, I pose a problem and am interested in solutions to that problem. It is in multiple respects a programming problem. I do not see how it is more subjective than most SO questions about how to solve a problem. – RAL Jun 16 '09 at 0:48
• Better as a community wiki because there's no code, IMO. – S.Lott Jun 16 '09 at 0:49
• Theoretical problems are second class citizens? Did you know that solving for prime numbers has recently been discovered to be O(n^12)? I think that is highly theoretical and quite relevant to programmers. BTW, why is big-oh notation used in so so many answers here? Really not sure why this is a problem... – RAL Jun 16 '09 at 1:01
• I didn't say this wasn't an interesting problem, I said it wasn't a programming problem. Both CS theorizing and every-day programming are interesting and important, but they're not the same thing. – Matthew Flaschen Jun 16 '09 at 1:29
• Stack Overflow specializes in programming questions that are answerable. Unfortunately, this question is essentially a mathematics education question (not programming related) that requires a subjective answer in such a way that a "correct answer" or "best answer" is impossible. The asker and answerers should realize that this may cause a poor quality of answer in general and subjective/inconsistent voting on answers (good answers not floating to the top). – Wesley Jun 16 '09 at 1:42

## 9 Answers

I think your explanation is the simplest, as that is what I learned. It's almost as if real numbers have multiple dimensions of infinity. It is infinite in one direction, but also in another.

Diagonalization is a very cool experiment, but I can see how it may go over beginners heads. It does make sense though, if it is demonstrated in a very deliberate way, going very slowly. Just throwing up numbers quick can be hard to follow I imagine.

I think the principle of Cardinality of the Continuum is also helpful, although perhaps can be simplified to a beginner level. Showing that there is more beyond simple real vs. integers can potentially help something to 'click'.

My recommended first step for teaching levels-of-infinity to people of limited mathematical background is "Why do mathematicians say that the set of even numbers and the set of whole numbers are the same size?" This introduces "if you can associate every member of set A with exactly one member of set B, mathematicians say the sets have the same size." Next comes showing that every fraction (every rational number) can be associated with exactly one counting number, using the diagonal method. Once they're satisfied with that, I bring up π, which everyone knows has an infinite number of non-repeating digits in its decimal expression, which means it cannot be expressed as a fraction, so it will be left over, and that means that the set of irrational numbers is larger than the set of counting numbers. Some wiseguys will object that π has a finite number of digits if you're working in base π, namely 1π, but you can come back at them with "okay, brainiac, write down the number of days in a week in base π."

• I was going to say something along these lines, and is probably the easiest way to conceptualize it. The word is of course a 1-1 correspondence. Can you "pair off" the numbers? I would start with the set of whole numbers and show how you can build correspondences to each superset until you get to Reals. – Chet Jun 16 '09 at 2:30

Where's the "very relevant" part?

Edit: OK, I've been writing code professionally for 13 years and I wouldn't call levels of infinity relevant to anything I've ever worked on.

And I guess I would draw a different conclusion from your theory. How is "we can only solve an infinitesimally small fraction of all problems" the limit of our craft?

Sounds to me like there are an infinite (countable or uncountable doesn't seem to make a difference) number of problems. Therefore our craft is unlimited -- we will never run out of problems to solve.

• I would think a programmer would find it relevant to know the limits of his craft. – RAL Jun 16 '09 at 0:58
• "In theory, there is no difference between theory and practice; but in practice, there is." There definitely is some truth to that statement, but it doesn't mean that working with theory is not a good exercise nor a useless one. Tempering the critical and abstract thinking that is required when solving problems for the real world is extremely relevant. – Sufian Jun 16 '09 at 1:15
• @Robert, up to a point, yes (personally, I think you passed that point but I'm only one guy and I've been wrong before - just ask my wife). A builder doesn't need to know how atoms work to be able to get a house built. – paxdiablo Jun 16 '09 at 1:20
• @Pax, thx for the compliment? hehe, but I really want to know so I can help more students understand useless theory. My brother-in-law introduced his kids to as many sports as possible, because it was impossible to know ahead of time which one they would like the most. – RAL Jun 16 '09 at 1:31
• @Sufian: finding that that quote is true simply means one's theory is not good enough :) – AakashM Jun 16 '09 at 7:07

There are several tens of thousands of words in the English language. You can count the number of words in a book or the number of books in the universe. You cannot count the number of books that will ever be

• Nice! Thank you! – RAL Jun 16 '09 at 1:25
• This is the most simplest way to explain it to somebody that doesn't understand the math. – David Basarab Jun 16 '09 at 1:32
• But, assuming each book takes up at least one atom, there can be at most 10^80 books ;-) – Jonas Kölker Jun 16 '09 at 1:33
• The problem is that it connects the countable infinite number of books that will ever be with the idea of something that is more than countable. (Counting strategy for books: Go with finishing date) – gha.st Jun 16 '09 at 2:27
• @Eric, this example is slightly misleading. The set of English books that can ever be written is infinite, but countable. You can easily create a rule that sets one-to-one correspondence between any given English book and an integer. – Igor Krivokon Jun 16 '09 at 2:40

Forgive the poorly written metaphors below.

I personally think of the countability/uncountability dichotomy as being very closely related to Zeno's paradox of the arrow.

The set of all natural numbers is countable, there is a specific method of generating the "next" integer, and it will get you a step forward. Countable sets are forward-moving in that sense. It's almost as if it has a velocity, it keeps moving forward.

The set of all real numbers is uncountable, like zeno's arrow.

If you have to move between the origin (0) and the destination (1 == 2-0), you must first go through the midpoint (1/2 == 2-1).

Now your destination is 1/2; If you must then go between the origin (0) and the (1/2), you must go through the midpoint (1/4 == 2-2)

So on and so forth, so to get between 0 and 1, you must first get between something inbetween, which you must first get between something inbetween. There is no finite method of calculating the "next" step, so the velocity (in contrast to the velocity of natural numbers) doesn't really exist, your next step is not going to take you anywhere.

Edit:

I realize now that this probably has to do with the total ordering and mapping of the set of natural numbers to any countable sets. If you can't totally order the items in a set, or you can't create a method to determine what the next item is in a set, chances are it's uncountable.

G) Therefore, if a language is infinite, it has an uncountably infinite number of subsets. Each of these represents a problem.

Citation needed. You can't merely assume that any (possibly infinite) set of Turing machines necessarily represents a distinct 'problem'. At the very least, you have to (separately) formalize the definition of 'problem' as much as Turing machines have been formalized.

• Yah, this is a little Turing-centric. Show me a language (subset), then write a finite state machine that recognizes it (solves the problem). Whether or not it is a uselful problem is another story. – RAL Jun 16 '09 at 15:59

Programmers (or at least, myself) don't often have to worry much about infinity in this way. When you place a finite box over any portion of the machine-representable real number line, you get a finite quantity of real numbers. =)

For example, a double precision variable has a finite number of possible values: 2^64.

• wow! I really feel hijacked :( Can you provide a link for guidelines, I am not getting useful info, thanks. – RAL Jun 16 '09 at 1:10
• @Robert Lamb, the arithmetic unit of contemporary computers represents the real numbers with a finite set of rational numbers. – Thomas L Holaday Jun 16 '09 at 1:36
• The finite limits of our modern computers are getting closer to infinity, although it will theoretically never get there. Understanding what happens very far out is essential to understanding scaling in the real world. Do you want to scale towards infinity at n^2 or log(n)? – Kekoa Jun 16 '09 at 18:00

Here's an example of a computable problem: at the start of a chess game, is it possible for white to force a win?

The number of possible moves and counter-moves is finite. All we have to do is build the trees and prune them. We haven't done this yet only because with current technology it would take billions of years.

Here is an example of a problem that is not computable: Given a two-dimensional view of a scene, construct a full three-dimensional model of the scene.

We do this all the time. (Make a room with a peephole in the door. Have someone furnish it. Look through the hole and describe everything you see.)

We do not compute the incomputable. We produce an approximate result (just like we compute and use an approximate value of pi, another incomputable number). We keep updating the result as more information comes in. That's what optical illusions are all about. When you look at the picture of "a vase, or is it two faces?" your visual system says "It's a vase. No. Wait. It's two faces. No. Wait. It's a vase." You see it switching back and forth between the two interpretations.

Just because something is not computable is no reason not to do it.

Conclusion...we can only solve an infinitesmally small fraction of all problems.

You must be web designer.