# Correctness of accuracy of Misra-Gries on combined streams

I got a homework on the accuracy of the Misra-Gries algorithm of combined streams. Prove that the accuracy of combined streams is at least as good as on the concatinated stream. So I was trying to come up with examples to understand the problem better. One that i found is the following:

Assume stream X = (a,a,b,b,c) and Y = (c,c,d,d,a) and k=3

Apply Misra-Gries to X:

``````| x_i || a      | a      | b      | b      | c      |
|-----||--------|--------|--------|--------|--------|
| d   || d[a]:1 | d[a]:2 | d[a]:2 | d[a]:2 | d[a]:1 |
|     ||        |        | d[b]:1 | d[b]:2 | d[b]:1 |
``````

and to Y:

``````| x_i || c      | c      | d      | d      | a      |
|-----||--------|--------|--------|--------|--------|
| d   || d[c]:1 | d[c]:2 | d[c]:2 | d[c]:2 | d[c]:1 |
|     ||        |        | d[d]:1 | d[d]:2 | d[d]:1 |
``````

Then according to Wikipedia I sum up the results and decrement the counters until only k counter remain. Or, according to my lecturer:

1. Combine the two sets of candidates, adding up frequencies for equal items.
2. Subtract the frequency of the k-th most frequent candidate from all frequency estimates.
3. Delete candidates with non-positive frequencies.

Which would result in slightly different summaries but that does not matter at this point. Lets take the Wikipedia approach:

1. Sum up:

d[a]: 1, d[b]: 1, d[c]: 1, d[d]: 1

1. Reduce until k counters left:

Every counter is reduced by one, so none is left.

Therefore the accuracy is $f_{XY}(c) -\frac{2n-F_m}{k} = f_{XY}(c) - \frac{2\cdot5 - 0}{3} = f_{XY}(c) - \frac{10}{3}\leq f^*_m(c)$

Accuracy = 10/3

Now let check for the Misra-Gries on the combined stream:

``````| x_i | a      | a      | b      | b      | c      | c | c      | d      | d      | a      |
|-----|--------|--------|--------|--------|--------|---|--------|--------|--------|--------|
| d   | d[a]:1 | d[a]:2 | d[a]:2 | d[a]:2 | d[a]:1 |   | d[c]:1 | d[c]:1 | d[c]:1 | d[d]:1 |
|     |        |        | d[b]:1 | d[b]:2 | d[b]:1 |   |        | d[d]:1 | d[d]:2 |        |
``````

For the accuracy: $f_{XY}(c) -\frac{n - F}{k} = f_{XY}(c) -\frac{10 - 1}{3} = f_{XY}(c) -\frac{9}{3} \leq f^*_{XY}(c)$

Accuracy = 9/3

Which for my understanding is more accurate than running two single streams and combining them. This though is contradictory to the claim written on Wikipedia:

The summaries (arrays) output by the algorithm are mergeable, in the sense that combining summaries of two streams s and r by adding their arrays keywise and then decrementing each counter in the resulting array until only k keys remain results in a summary of the same (or better) quality as compared to running the Misra-Gries algorithm over the concatenation of s with r.

So where is my mistake?

P.S. i would realy like to provide images for those formulas but i am not allowed because reputation < 10....