For a simple problem of array length 5 to start with ( in practice the array length might be 20.. )

I have got a **predefined** set of patterns, like **AAAAB, AAABA, BAABC, BCAAA, ...**. **Each pattern is of the same length of the input array**. I would need a function that takes any integer array as input, and returns **all** the patterns it matches. (**an array may match a few patterns**) as fast as possible.

"**A**" means that in the pattern all numbers at the positions of A are equal. E.g. **AAAAA** simply means all numbers are equal, **{1, 1, 1, 1, 1}** matches **AAAAA**.

"**B**" means the number at the positions B are not equal to the number at the position of A. (i.e. a wildcard for a number which is not A)**Numbers represented by B don't have to be equal**. E.g. **ABBAA** means the 1st, 4th, 5th numbers are equal to, say x, and 2nd, 3rd are not equal to x. **{2, 3, 4, 2, 2}** matches **ABBAA**.

"**C**" means this position can be any number (i.e. a wildcard for a number). **{1, 2, 3, 5, 1}** matches **ACBBA**, **{1, 1, 3, 5, 1}** also matches **ACBBA**

I am looking for an efficient ( in terms of comparisons number) algorithm. It doesn't have to be optimal, but shouldn't be too bad from optimal. I feel it is sort-of like the decision tree...

### A very straightforward but inefficient way is like the following:

Try to match each pattern against the input. say

**AABCA**against**{a, b, c, d, e}**. It checks if`(a=b=e && a!=c)`

.If the number of patterns is

**n**, the length of the pattern/array is**m**, then the complexity is about**O(n*m)**

### Update:

**Please feel free to suggest better wordings for the question**, as I don't know how to make the question simple to understand without confusions.

An ideal algorithm would need some kind of preparation, like to transform the set of patterns into a decision tree. So that the complexities **after** preprocessing can be achieved to something like O(log n * log m) for some special pattern sets.(just a guess)

Some figures that maybe helpful: the predefined pattern sets is roughly of the size of 30. The number of input arrays to match with is about 10 millions.

Say, if **AAAAA** and **AAAAC** are both in the pre defined pattern set. Then if **AAAAA** matches, **AAAAC** matches as well. I am looking for an algorithm which could recognize that.

### Update 2

@Gareth Rees 's answer gives a O(n) solution, but under assumption that there are not many "**C**"s. (otherwise the storage is huge and many unnecessary comparisons)

I would also welcome any ideas on how to deal with situations where there are many "**C**"s, say, for input array of length 20, there are at least 10 "**C**"s for each predefined patterns.

`{2, 3, 4, 2, 2}`

is matchingABBAA. But is`{2, 3, 3, 2, 2}`

matchingABBAA? – Alex Filipovici Dec 15 '12 at 21:15`A`

present in all available patterns? – Alex Filipovici Dec 15 '12 at 21:25