The complexity is O(m log n).

Let the long array be called `a`

and the short array be `b`

then the algorithm you described can be written as

```
for each x in b
insert x into a
```

There are m iterations of the loop. Each insertion into a sorted array is an O(log n) operation. Therefore the overall complexity is O (m log n).

Since `b`

is sorted the above algorithm can be made more efficient

```
for q from 1 to m
if q == 1 then insert b[q] into a
else
insert b[q] into a starting from the position of b[q-1]
```

Can this give better asymptotic complexity? Not really.

Suppose elements from `b`

are evenly spread along `a`

. Then each insertion will take `O(log (n/m))`

and the overall complexity will be `O(m log(n/m) )`

. If there exists a constant `k>1`

that does not depend on `n`

or `m`

such that `n > k * m`

then `O(log(n/m)) = O(log(n))`

and we get the same asymptotic complexity as above.