Is there a function that searches a sequence of elements for a subsequence? I am looking for an analogue of `StringPosition`

for `List`

s. In my current application I am working with integer lists, but I'd be interested in a general `FindSequence[list, pattern, n]`

function which will find the first `n`

occurrences of `pattern`

in `list`

.

Here's a toy example:

Generate some data:

```
In[1]:= $HistoryLength = 0
Out[1]= 0
In[2]:= Timing[digits = First[RealDigits[\[Pi], 2, 10000000]];]
Out[2]= {26.5, Null}
```

Let's convert it to a string so we can compare to `StringPosition`

. This is very slow an memory hungry. (The memory is freed when the evaluation finishes.)

```
In[3]:= Timing[str = StringJoin[ToString /@ digits];]
Out[3]= {43.813, Null}
```

I am looking for this subsequence:

```
In[4]:= patt = {1, 1, 1, 1, 0, 1, 1, 1, 0, 0, 1, 1, 0, 1, 1, 0, 1, 0,
1, 0, 1, 1};
In[5]:= strpatt = StringJoin[ToString /@ patt];
```

Searching the string is very fast:

```
In[6]:= StringPosition[str, strpatt] // Timing
Out[6]= {1.047, {{5737922, 5737943}}}
```

This is a simple implementation of searching for numerical arrays. It's slower than `StringPosition`

:

```
In[7]:= Timing[
corr = ListCorrelate[patt, digits];
Select[Flatten@Position[corr, patt.patt],
digits[[# ;; # + Length[patt] - 1]] === patt &]
]
Out[7]= {2.234, {5737922}}
```

**Summary:**

- Is there a builtin that searches lists for subsequences?
- If there isn't, what is a fast and elegant implementation for numeric lists (my
*practical*problem)? - What about generic lists that can contain anything? （There are two possibilities here: "static" patterns only such as
`{1,0,1}`

, or general ones like`{1,_,1}`

, though these latter ones may introduce complications.)

I expect this will have many solutions, some fast, some more elegant, some more general :-)

Related questions:

- A fast implementation in Mathematica for Position2D (2D case of the same thing)
- What is the best way to find the period of a (repeating) list in Mathematica?

Interesting reading:

**EDIT:**

I just found the undocumented `LongestCommonSubsequencePositions`

. `LongestCommonSubsequencePositions[a, b]`

will find the longest common subsequence of the lists `a`

and `b`

, and return position of its *first* occurrence only in both `a`

and `b`

. (The documented `LongestCommonSubsequence`

, which I was not aware of, will only return the subsequence itself, not its position.)

It is slower than the alternatives above, but it works on general lists that can contain any expression.

```
In[57]:= LongestCommonSubsequencePositions[digits, patt] // Timing
Out[57]= {5.25, {{5737922, 5737943}, {1, 22}}}
```