Mahjong programming tests

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Every programmer who has previously tackled attempting to test and verify the veracity of his functions should at one point have attempted to run a set of tests.

Shanten tests

The following tests should work and provide results with an ever decreasing shanten, until a block change occurs. The tests below should provide a series of tests where the shanten count goes down from 6 to 0 three times, -1 _____ times and 0 _____ times.

Currently (2015.04.11@1830 UTC): 6,5,4,3,2,1,0,6,5,4,3,2,1,0,6,5,6.

Tile formats are offered in string arrays and MPSZ format.

String array MPSZ format
"7,17,29,41,53,67,77,89,101,111,113,117,127"
"7,11,29,41,53,67,71,89,101,111,113,115,127"
"7,11,31,33,53,57,73,79,101,105,115,117,127"
"9,11,31,33,53,57,73,79,101,105,115,117,127"
"9,10,11,53,57,73,79,101,105,115,125,127,135"
"8,10,11,53,57,60,73,79,101,105,115,125,127"
"8,9,10,53,57,60,73,79,98,101,105,125,127"
"6,17,35,37,53,71,77,89,101,111,113,117,127"
"6,17,34,37,53,71,72,89,101,111,113,117,127"
"6,17,33,37,53,71,72,101,111,113,117,118,127"
"3,17,33,37,53,71,72,101,111,113,117,118,127"
"3,32,33,37,53,71,72,106,111,113,117,118,127"
"3,32,34,37,68,71,88,91,111,113,117,118,127"
"2,32,34,68,71,88,91,112,113,117,118,124,127"
"1,6,9,41,53,67,77,89,101,111,113,117,127"
"1,2,3,41,53,67,77,89,101,111,113,117,127"

"13,17,29,37,53,67,73,89,101,111,113,117,127,135"
"258m258p258s1235z"
"238m2589p58s1225z"
"2389m56p1289s235z"
"3389m56p1289s235z"
"333m56p1289s2557z"
"333m567p1289s255z"
"333m567p12789s55z"
"259m159p258s1235z"
"259m159p158s1235z"
"259m159p18s12335z"
"159m159p18s12335z"
"199m159p19s12335z"
"199m199p55s12335z"
"199m99p55s223355z"
"123m258p258s1235z"
"111m258p258s1235z"

"458m158p158s12357z"


Elements tested

7, 17, 29: 6-shanten. All crap, 4 terminals.
7, 11, 29: 5-shanten. 3 protogroups, 5 terminals.
7, 11, 31: 4-shanten. 5 protogroups without pair.
9, 11, 31: 3-shanten. 5 protogroups including a pair.
9, 10, 11: 2-shanten. 1 group, 4 protogroups including a pair.
8, 10, 11: 1-shanten. 2 groups, 3 protogroups including a pair.
8, 9, 10: Tenpai (0-shanten). 3 groups, 2 protogroups including a pair.
6, 17, 35: 6-shanten. All crap, 7 different terminals (no pair).
6, 17, 34: 5-shanten. All crap, 8 different terminals (no pair).
6, 17, 33: 4-shanten. All crap, 8 different terminals, one terminal pair.
3, 17, 33: 3-shanten. All crap, 9 different terminals, one terminal pair. (13-10)
3, 32, 33: 2-shanten. All crap, 10 different terminals, two terminal pairs. (13-11)
3, 32, 34: 1-shanten. 5 pairs, no groups.
2, 32, 34: Tenpai (0-shanten). 6 pairs.
1, 6, 9: 6-shanten. One group (sequence), rest crap.
1, 2, 3: 5-shanten. One group (triplet), rest crap (pair present obv.).

13, 17, 29: 6-shanten. Mostly crap, 6 terminals, 1 protogroup, no pair. (14 tiles start)