I've been using haskell for quite a while now, and I've read most of Real World Haskell and Learn You a Haskell. What I want to know is whether there is a point to a language using lazy evaluation, in particular the "advantage" of having infinite lists, is there a task which infinite lists make very easy, or even a task that is only possible with infinite lists?

Here's an utterly trivial but actually daytoday useful example of where infinite lists specifically come in handy: When you have a list of items that you want to use to initialize some keyvaluestyle data structure, starting with consecutive keys. So, say you have a list of strings and you want to put them into an With infinite lazy lists, the list itself takes the role of the running counter; just use Sure, it's essentially the same thing in both cases. But having lazy infinite lists lets you express the concept much more directly without having to worry about details like the length of the input list or keeping track of an extra counter. 


An obvious example is chaining your data processing from input to whatever you want to do with it. E.g., reading a stream of characters into a lazy list, which is processed by a lexer, also producing a lazy list of tokens which are parsed into a lazy AST structure, then compiled and executed. It's like using Unix pipes. 


I found it's often easier and cleaner to just define all of a sequence in one place, even if it's infinite, and have the code that uses it just grab what it wants.
instead of having numerous similar but not quite the same functions that generate a subset
The benefits are greater when different subsections of the same sequence are used in different areas. 


Basically, lazy lists allow you to delay computation until you need it. This can prove useful when you don't know in advance when to stop, and what to precompute. A standard example is u_n a sequence of numerical computations converging to some limit. You can ask for the first term such that u_n  u_{n1} < epsilon, the right number of terms is computed for you. Now, you have two such sequences u_n and v_n, and you want to know the sum of the limits to epsilon accuracy. The algorithm is:
All is done lazily, only the necessary u_n and v_n are computed. You may want less simple examples, eg. computing f(u_n) where you know (ie. know how to compute) f's modulus of continuity. 


Infinite data structures (including lists) give a huge boost to modularity and hence reusability, as explained & illustrated in John Hughes's classic paper Why Functional Programming Matters. For instance, you can decompose complex code chunks into producer/filter/consumer pieces, each of which is potentially useful elsewhere. So wherever you see realworld value in code reuse, you'll have an answer to your question. 


Sound synthesis  see this paper by Jerzy Karczmarczuk: http://users.info.unicaen.fr/~karczma/arpap/cleasyn.pdf Jerzy Karczmarcuk has a number of other papers using infinite lists to model mathematical objects like power series and derivatives. I've translated the basic sound synthesis code to Haskell  enough for a sine wave unit generator and WAV file IO. The performance was just about adequate to run with GHCi on a 1.5GHz Athalon  as I just wanted to test the concept I never got round to optimizing it. 


Infinite/lazy structures permit the idiom of "tying the knot": http://www.haskell.org/haskellwiki/Tying_the_Knot The canonically simple example of this is the Fibonacci sequence, defined directly as a recurrence relation. (Yes, yes, hold the efficiency complaints/algorithms discussion  the point is the idiom.): Here's another story. I had some code that only worked with finite streams  it did some things to create them out to a point, then did a whole bunch of nonsense that involved acting on various bits of the stream dependent on the entire stream prior to that point, merging it with information from another stream, etc. It was pretty nice, but I realized it had a whole bunch of cruft necessary for dealing with boundary conditions, and basically what to do when one stream ran out of stuff. I then realized that conceptually, there was no reason it couldn't work on infinite streams. So I switched to a data type without a nil  i.e. a genuine stream as opposed to a list, and all the cruft went away. Even though I know I'll never need the data past a certain point, being able to rely on it being there allowed me to safely remove lots of silly logic, and let the mathematical/algorithmic part of my code stand out more clearly. 


One of my pragmatic favorites is The general pattern seen here is that if we want to do some operation on a finite list, rather than having to construct a specific finite list that will “do the thing we want,” we can use an infinite list that will work for all sizes of lists. camcann’s answer is in this vein. 

