i3 : SchPblm = {
({2,1}, random(CC^6,CC^6)),
({2,1}, random(CC^6,CC^6)),
({2,1}, random(CC^6,CC^6))
};
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i5 : solveSchubertProblem(SchPblm, k,n)
o5 = {| -.973546-.443329ii -.193482-.957391ii -.460977-.267623ii |, |
| .153343-.291038ii .339479-1.30008ii -.577303-.171329ii | |
| .326239-.770744ii .120186-1.46205ii -.0769985-.323186ii | |
| -.451322-.514227ii -.144874-.987789ii -.589493-.209825ii | |
| -.0525679-.692383ii .364061-.704785ii -.325325-.185011ii | |
| -.942864-.594173ii -.826353-.203654ii -.236865+.691374ii | |
------------------------------------------------------------------------
-5.47422+1.18674ii -.912706-1.64344ii -.590144+.126046ii |}
-2.80395-.714508ii -.793467-2.20255ii -.016225+.340982ii |
-2.29873-2.34724ii -.905617-2.59114ii .0951404+.355536ii |
-3.36313+2.14592ii -.703202-1.58202ii -.375349+.205204ii |
-3.91243-.845457ii -.528411-.900447ii -.187047+.545512ii |
-4.19554+1.93172ii -1.11528-.480829ii .19859+1.24706ii |
o5 : List
|
i6 : printStatistics()
# moves of type {} = 2
# moves of type {0, 0, 0} = 3
# moves of type {0, 1, 0} = 2
# moves of type {0, 2, 0} = 10
# moves of type {1, 0, 0} = 1
# moves of type {1, 1, 0} = 3
# moves of type {1, 1, 1} = 3
# moves of type {1, 2, 0} = 6
# moves of type {2, 0, 0} = 3
# moves of type {2, 1, 0} = 1
# moves of type {2, 2, 0} = 12
tracking time = .0726057
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