For a previous SE question, "What algorithm to use to delete duplicates?" I described an algorithm for a probably-similar problem except with 50GB files instead of 20GB. The method is faster than sorting the big files in that problem.
Here is an adaptation of the method to your problem. Let's call the original two files A and B, and suppose A is larger than B. I don't understand from your problem description what is supposed to happen if or when a duplicate is detected, but in the following I assume you want to leave file A unchanged, and remove from B any items that also are in A. I also assume that entries within A are specified to be unique within A at the outset, and similarly for B. If that is not the case, the method needs more adapting and about twice as much I/O.
Suppose you can fit 1/k'th of file A into memory and still have room for the other required data structures. The whole file B can then be processed in k or fewer passes, as below, and this has a chance of being much faster than sorting either file, depending on line lengths and sort-algorithm constants. Sorting averages O(n ln n) and the process below is O(k n) worst case. For example, if lines average 10 characters and there are n = 2G lines, ln(n) ~ 21.4, likely to be about 4 times as bad as O(k n) if
k=5. (Algorithm constants still can change the situation either way, but with a fast hash function the method has good constants.)
- Let Q = B (ie rename or copy B to Q)
- Allocate a few gigabytes for a work buffer W, and a gigabyte or so for a hash table H. Open input files A and Q, output file O, and temp file T. Go to step 2.
- Fill work buffer W by reading from file A.
- For each line L in W, hash L into H, such that H[hash[L]] indexes line L.
- Read all of Q, using H to detect duplicates, writing non-duplicates to temp file T.
- Close and delete Q, rename T to Q, open new temp file T.
- If EOF(A), rename Q to B and quit, else go to step 2.
Note that after each pass (ie at start of step 6) none of the lines in Q are duplicates of what has been read from A so far. Thus, 1/k'th of the original file is processed per pass, and processing takes k passes. Also note that although processing will be I/O bound you can read and write several times faster with big buffers (eg 8MB) than line-by-line.
The algorithm as stated above does not include buffering details or how to deal with partial lines in big buffers.
Here is a simple performance example: Suppose A, B both are 20GB files, that each has about 2G passwords in it, and that duplicates are quite rare. Also suppose 8GB RAM is enough for work buffer W to be 4GB in size leaving enough room for hash table H to have say .6G 4-byte entries. Each pass (steps 2-5) reads 20% of A and reads and writes almost all of B, at each pass weeding out any password already seen in A. I/O is about 120GB read (1*A+5*B), 100GB written (5*B).
Here is a more involved performance example: Suppose about 1G randomly distributed passwords in B are duplicated in A, with all else as in previous example. Then I/O is about 100GB read and 70GB written (20+20+18+16+14+12 and 18+16+14+12+10, respectively).