from this site:

The KMP algorithm preprocess the pattern P by computing a failure function f that indicates the largest possible shift s using previously performed comparisons.

Specifically, the failure function f(j) is defined as the length of the longest prefix of P that is a suffix of P[i . . j].

**Here is a pseudo code for the construction, I guess you can get the detail of the explaination on the site**

```
KNUTH-MORRIS-PRATT FAILURE (P)
Input: Pattern with m characters
Output: Failure function f for P[i . . j]
i ← 1
j ← 0
f(0) ← 0
while i < m do /// your complexity will be O(length of pattern)
if P[j] = P[i]
f(i) ← j +1
i ← i +1
j← j + 1
else if (j != 0)
j ← f(j - 1)
else
f(i) ← 0
i ← i +1
```

Hope it answers your question