How do I express {2n+3m+1n,m∈N} in list comprehension form? N is the set of natural numbers, including 0.

Shortly:



Isn't {2n+3m+1n,m ∈ ℕ} = ℕ  {0,2}? 


The following Haskell function will give you all pairs from two lists, even if one or both is infinite. Each pair appears exactly once:
You could then write your list as
To get a feel for how it works, draw an infinite quarterplane, and look at the results of



To generate all of them, you either need to realize, like users vartec and Hynek Pichi Vychodil, that the set of numbers you want is just the natural numbers  {0,2}. Or you need to somehow enumerate all the pairs (m,n) such that m,n are nonnegative. One way to do that is to go along each of the "diagonals" where If we let So for you, you can just do
(Of course this method will also produce duplicates for you because there are multiple (m,n) pairs that generate the same number in your expression.) 


my 0.2:



You can try enumerating all pairs of integers. This code is based in the enumeration described at University of California Berkeley (doesn't include 0)
But you can use another enumeration. Then you can do:


