This is a part of a program that analyzes the odds of poker, specifically Texas Hold'em. I have a program I'm happy with, but it needs some small optimizations to be perfect.
I use this type (among others, of course):
type T7Cards = array[0..6] of integer;
There are two things about this array that may be important when deciding how to sort it:
- Every item is a value from 0 to 51. No other values are possible.
- There are no duplicates. Never.
With this information, what is the absolutely fastest way to sort this array? I use Delphi, so pascal code would be the best, but I can read C and pseudo, albeit a bit more slowly :-)
At the moment I use quicksort, but the funny thing is that this is almost no faster than bubblesort! Possible because of the small number of items. The sorting counts for almost 50% of the total running time of the method.
Mason Wheeler asked why it's necessary to optimize. One reason is that the method will be called 2118760 times.
Basic poker information: All players are dealt two cards (the pocket) and then five cards are dealt to the table (the 3 first are called the flop, the next is the turn and the last is the river. Each player picks the five best cards to make up their hand)
If I have two cards in the pocket, P1 and P2, I will use the following loops to generate all possible combinations:
for C1 := 0 to 51-4 do if (C1<>P1) and (C1<>P2) then for C2 := C1+1 to 51-3 do if (C2<>P1) and (C2<>P2) then for C3 := C2+1 to 51-2 do if (C3<>P1) and (C3<>P2) then for C4 := C3+1 to 51-1 do if (C4<>P1) and (C4<>P2) then for C5 := C4+1 to 51 do if (C5<>P1) and (C5<>P2) then begin //This code will be executed 2 118 760 times inc(ComboCounter[GetComboFromCards([P1,P2,C1,C2,C3,C4,C5])]); end;
As I write this I notice one thing more: The last five elements of the array will always be sorted, so it's just a question of putting the first two elements in the right position in the array. That should simplify matters a bit.
So, the new question is: What is the fastest possible way to sort an array of 7 integers when the last 5 elements are already sorted. I believe this could be solved with a couple (?) of if's and swaps :-)