Find Maximum money you can make by making at most 2 transactions(find the two largest non-overlapping increases in a list)

Note: no overlap, the second buy should be later than first sell.

Given a stream of quotes for a stock from the last trading day. Assume its already time sorted. Find the maximum amount of money you could have made on this stock by making 2 transactions. A buy and a sell is counted as one transaction.

Example:

``````time Price
1 10
2 11
3 7
4 15
5 8
6 17
7 16
``````

answer is 8 + 9 buy at 3, sell at 4, buy at 5, sell at 6.

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seriously? there are better answers that that. Are there some hidden rules you forgot to include in your question (e.g. can the trades overlap; do I get to re-invest money I make in previous trades or not; have I got infinite seed money; can I short sell)? –  Alex Brown Sep 4 '12 at 22:28
is it me or buying at 7(4) sell at 8(15) then buy at 9(5) sell at 12(17) give a much better +value? 8+12 = 20 –  Samy Arous Sep 4 '12 at 22:28
So I can't buy at 3 twice, then sell at 6 twice? –  Keith Randall Sep 4 '12 at 22:31
So basically what you really want is "find the two largest non-overlapping increases in a list"? –  Jerry Coffin Sep 4 '12 at 23:40
Are you asking for clever answers? For every combination of 4 unique points, you could calculate the profit from a buy/sell/buy/sell at those points. Now you know how much you could make in every scenario, including the scenario that profits the most. –  Drew Dormann Sep 5 '12 at 3:50

Dynamic programming

d[i][j].b = income after i-th time, having made j transactions, j-th transaction only buy d[i][j].s = income after i-th time, having made j transactions, j-th transaction bought and sold base d[i][j].b = d[i][j].v = -inf; d[0][0].s = 0;

in this particular case j is 1-2 only

``````d[i][j].b = max(d[i-1][j-1].s - price[i], d[i-1][j].b)
d[i][j].s = max(d[i-1][j].b + price[i], d[i-1][j].s)
``````

something like this

O(n*k) where k - number of transactions, so O(n) in this case

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