Nice to see two up votes for the question. I'll re-word my question now to avoid confusion.
The question is how to fill up a mxn grid/matrix with random but pre-defined shapes without a hole. Pre-defined shapes have a variable k which is how many blocks the shape is made of. Each block is a square and is the same size of a grid square (ie, 1x1 grid). The shape can be rotated to fit into the grid, but does not shrink or expand. k does not change for one round, in another word, m, n, and k does not change while I run the answer script. When I run the script second time, I may change one or all of them. For example, the first time, I may run the answer script with k=4, m=10, and n=20. The script finishes and print out output. The second time I'll k=3, m=6 and n=10. I'll assure m times n and the product modulate k equals zero (m x n % k = 0) to make sure they fit each other mathematically. Okay, one more condition: 1
The script need fill the grid with random shapes from the pool of preset k. When k=2, predefined shapes have just one kind, two blocks together. If you think with no rotation, then it has two kinds, horizontal and vertical. When k=4, that's basically fill up the grid with Tetris blocks, i.e., totally 7 kinds of predefined shapes (each of them can rotate, and make ~20 kinds). What are the predefined shapes for k=5, I don't know yet. The answer can compute that or can be hard-coded, since it's not difficult to find all shapes for k=5.
If the solution is limited, no random is required. For example, m=2, n=2, and k=4; or m=1, n=4, k=2. No other way around, no random.
No holes can be left anywhere in the grid. I think, no prove thought, many grid with mxn and mxn%k=0 will have a solution without hole. Intuitively it sounds reasonable, but mathematically I don't know. If m or n is k's multiples, it's guaranteed to have solution (of all straight bars).
Ideally I want k be a small integer, like k<10, but in the range of 2 to 5 is acceptable. If it is simpler, we can have a fixed k here, such as 4, since Tetris comes with well-known 7 shapes (ITOLJSZ).
I'm looking for solutions preferably in Perl. Python is okay too. Program takes m, n, and k to run each time. Again, I'll have m,n,k fit mxn%k=0.
Effort of myself, I tried in Perl, can solve some cases of k=3 and failed some cases because of singletons (holes) in the edges/corners. Need a good way to check if any block becomes singleton. My text output looks like this (m=4, n=9, k=3). You can of course use this kind or any format that makes sense.
AABB ACCB DCEE DFFE DFGH IGGH IIJH KKJJ KLLL
I'll set up bounty of 100 points (thanks those two up-vote, I now have 107 reputations) to award the best solution.
Thanks for your input.