# stadium problem: Provide algorithm to solve the problem

In a small stadium there are several thousand people in the stands. Devise a distributed algorithm enabling the audience to count itself. Do not assume any particular geometry of the stadium except, if you want, that it is bowl shaped. Explicitly state your assumptions, then present your algorithm and analysis

I was assuming the members to be a linked-list and appending the counter and free(ptr)..I may be wrong...Kindly provide some useful insights

Thanks in adv...

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What specifically is your question here? – Lasse V. Karlsen Mar 25 '11 at 12:27
which algorithm would help me solve the above problem with min complexity – garima Mar 25 '11 at 13:12
I don't think it is possible in general. For example, what if it is a large stadium with only 2 people, and they are not within communication range of each other? – mbeckish Mar 25 '11 at 16:22

## 5 Answers

Assuming everyone can talk to his/her neighbor (possibly over many empty seats) and that fans of team A are willing to speak to fans of team B, the following could work:

Everyone grabs his/her nearest neighbor, who is not already grabbed by someone else, to form groups of at most two people. Now everyone remembers the size of the group they are in (can be 1 or 2). Now a leader of each group is chosen in a way that he is able to communicate to a member of another group. The leaders of each group try to join their group with one other and each member of the two (now joined) groups remembers the sum of the members of each group (this can be done by broadcasting the new value to be added to the group). This process continues until there is only one group left. Upon termination of this process everyone knows the number of people in the stadium.

Hope this helps.

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thanks a lot... – garima Mar 25 '11 at 14:39
+1, your solution does not need too much of symmetry breaking, and also no possibility of duplicate counting. You could alter to allow a leader election strategy. – CMR Mar 25 '11 at 19:00

In a small stadium there are several thousand people in the stands. Devise a distributed algorithm enabling the audience to count itself.

Feynman answer (see round manhole question): Have everyone shout "Several thousand!"

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+1, the answer is in the question... Sort of the Buddhist mu thing – CMR Mar 26 '11 at 0:57

Here is another algorithm:

1. Let everyone count the others and himself.
2. Then, at the sound of a horn, each counter shout his count.
3. Keep the most shouted.

With this algorithm you can cope with errors.

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Your solution might work, but does not seem to distribute the load. – CMR Apr 8 '11 at 13:02
You're right. This is one extreme end of parallel computing (Or multi agents in general): every agent compute the whole task. This is extremely fault tolerant. The other extreme is: every agent write "+1" on a paper and gives this paper to a controller agent. – Jason Apr 8 '11 at 13:40

For every column, a leader is chosen with the rule "the person in the row closest to the field is the leader" (these seats are usually filled). The leader initiates a count of the people in that column in the following manner:
1. Shake hand with the person directly sitting behind, and ask, "you?"
2. If no one is behind the person, the response should be 1, or else do step 1 with person behind, and the answer is one more than the answer from the person behind.
3. The leader immediately writes this number on a board, and holds it up
4. Among these leaders, the youngest person should start collecting these boards, and add them. If she meets a person younger than her collecting boards, the count till then is handed over to the other person. If the same age, the taller person would take over.

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• Everyone drops their dacks, and the "output" is available in the local paper the next day ala "N people arrested at world's first mass-streaker incident". (i.e. the application asks the system to do the work).
• Each person picks one other person to fight, and first asks how many people they've knocked out. Winner finds another opponent, adds the defeated opponent's count. Last man (or woman) standing has the answer.
• Everyone stands up, plucks a hair, then hands it to someone nearby with at least as many hairs before sitting down again. Standing people continue to seek others to give hairs too. The last person counts the hairs.
• You invite people to grab a bag of minties from the canteen, then hand them around until they can't find anyone who hasn't had one, then drop the bag at a central point. Multiply bags * number-of-minties-per-bag - number-of-minties-left-in-bags.
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+1 for 'last man standing'! – CMR Apr 8 '11 at 12:54