# What algorithm can be used to find the optimal solution for this?

I have accounts with positive and negative balance and a pledge relationship between some. A pledge gives accounts with negative balance the right to retrieve money from the pledging account to cover their loss.

I want to find the optimal order of invoking this right of retrieving money.

``````            1    2    3
A 1000 | -1000 -500 -500
B 1000 | -1000
``````

In the given example account A and B have a positive balance of 1000 and accounts 1,2,3 are covered by priority (1 > 2 > 3). I want to cover as many accounts as possible by distributing the money of A and B on 1,2,3 while honoring the priority.

In this particular example choosing A1 as my first pair would result in only covering 1000 but if I choose B1, A2, A3 I have the optimal solution of covering 2000.

How is this kind of optimization problem called and what are the algorithms to tackle it?

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You will get more answers if you explain the accounting terminology in your question. What do pledging, shortfall, and covering mean? –  japreiss Dec 1 '11 at 14:50
Perhaps you could find better answers at cstheory.stackexchange.com or math.stackexchange.com –  sehe Dec 1 '11 at 14:51
I am pretty sure cstheory would be able to answer this easily but this question is not on topic for the site. They want research grade questions. –  OliverS Dec 1 '11 at 15:31

It's basically a network flow problem. I'll draw the capacitated graph for your example (unlabeled arcs have infinite capacity). `s` is the source and `t` is the sink.

``````     >A------->1
1000/ |\       ^\
/  | \     /  \1000
/   |  \   /    \
/    |   \ /  500 v
s     |    /->2--->t
\     \  /        ^
\     \/        /
\    /\       /500
1000\  /  \     /
>B    --->3
``````

The answer isn't the max flow; it's the flow that maximizes 1, then 2, then 3. One poly-time algorithm is to modify a max flow algorithm based on augmenting paths (simple paths!—otherwise we might take flow away from a higher priority account) preferentially to augment paths via 1, then 2, then 3.

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Looks promising, I will read up on it in my Cormen and mark accepted once I can reproduce it. Thanks. –  OliverS Dec 1 '11 at 16:13