I have ** n sorted lists** (5 < n < 300). These lists are quite long (300000+ tuples). Selecting the top k of the individual lists is of course trivial - they are right at the head of the lists.

Example for k = 2:

```
top2 (L1: [ 'a': 10, 'b': 4, 'c':3 ]) = ['a':10 'b':4]
top2 (L2: [ 'c': 5, 'b': 2, 'a':0 ]) = ['c':5 'b':2]
```

Where it gets more interesting is when I want the **combined top k across all the sorted lists**.

```
top2(L1+L2) = ['a':10, 'c':8]
```

Just combining of the top k of the individual list would not necessarily gives the correct results:

```
top2(top2(L1)+top2(L2)) = ['a':10, 'b':6]
```

The goal is to **reduce the required space** and keep the sorted lists small.

```
top2(topX(L1)+topX(L2)) = ['a':10, 'c':8]
```

The question is whether there is an algorithm to calculate the combined top k having the **correct order while cutting off the long tail** of the lists at a certain position. And if there is: How does one find the limit X where is is safe to cut?

Note: Correct **counts are not important**. Only the order is.

```
top2(magic([L1,L2])) = ['a', 'c']
```