Sign up ×
Stack Overflow is a community of 4.7 million programmers, just like you, helping each other. Join them; it only takes a minute: In this question we have to find number of ways to arrange 2X1 tiles in 4Xw (w >=1) rectangle ? I have tried this question and has given much time to it but was not able to come up with any solution . how to approach for these kinds of problem. meaning how to make dp recurrence for them. ?

share|improve this question
@RBarryYoung what to describe ? – Utkarsh Srivastav Apr 14 '12 at 15:30
tl;dr count the number of perfect matchings in an n*4 grid graph. FKT works on all planar graphs. – oldboy Apr 14 '12 at 15:31
@uts the problem you are asking for help on. – RBarryYoung Apr 14 '12 at 15:32

4 Answers 4

up vote 7 down vote accepted

You can build the 4xW rectangle row-by-row. When you build the next row the previous row can be in 6 different states:

XXXX (1 - filled)
XX-- (2)
-XX- (3)
--XX (4)
X--X (5)
---- (6 - empty)

For example if the previous row is (5), you have to put two vertical dominos, and then the next row is going to be (3):


Let X(W,q) denote the possible combinations of a 4xW rectangle where the last row is in state q and the rest is completely filled.

If you know X(W-1,q) for all the 6 q states you can easily calculate X(W,q).

You know the initial states X(1,q) (q=1..6 -> 1, 1, 1, 1, 1, invalid). So you can increase W and get these numbers for each W.

The final result is X(W,1) (last row filled).

share|improve this answer
In the example, do you mean previous row is 5 and next row is 3? Or am I wrong? – Rikayan Bandyopadhyay May 29 '14 at 22:13
fixed the typo, thx. – Karoly Horvath May 31 '14 at 7:34

I would try a backtracking algorithm: lay all tiles horizontally first, then backtrack until you can lay a vertical tile (then forward with horizontal layering) -- eventually you will enumerate all possible solutions and each only once (a square in the last backtraking phase will either contain a horizontal or a vertical tile, which will give unique solutions, when exists).

I do not know, however if this is an optimal algorithm for solving the problem.

share|improve this answer
There are five ways to tile 2*4. There's no way you're going to be able to enumerate the >5**500 solutions for n = 1000 in time. – oldboy Apr 14 '12 at 15:38

I too am a beginner at this variation of Dynamic programming, but this link mentions;jsessionid=A5053396424C9F9BBB9337ECAC9C6C17?module=Thread&threadID=770579&start=0&mc=2#1643035 that you need to apply "Dynamic programming with profiles", and that link also points to a tutorial specifically, "layer count+ layer profile".

From the above link: "This is the toughest type of DP state domain. It is usually used in tiling or covering problems on special graphs. The classic examples are: calculate number of ways to tile the rectangular board with dominoes (certain cells cannot be used); or put as many chess figures on the chessboard as you can so that they do not hit each other (again, some cells may be restricted)."

Other more approachable tutorials on this technique are available at:

I'm working my way through them as well.

This isn't an answer to the particular question you asked, but more of a general technique that people follow when solving this class of problems.

share|improve this answer

Just se the pattern if by removing any 2*1 block a pattern(gemoetry ) arises such that it is againthe intermediate result, then it gives the recursive function. From that just create DP from it.

For your problem just see the link. It will explain everything

For further refernecr juist see the link of IOI training

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.