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from Numberjack import *
# Golomb Ruler --- CSPLib prob006
# A Golomb ruler may be defined as a set of m marks/integers 0 = a_1 < ... < a_m
# such that the pairwise differences between marks are distinct. The objective
# is to find optimal (minimum length) rulers.
def get_model(param):
m = param['marks']
n = 2 ** (m - 1)
marks = VarArray(m, n, 'm')
distance = [marks[i] - marks[j] for i in range(1, m) for j in range(i)]
model = Model(
Minimise(marks[-1]), # objective function
[marks[i-1] < marks[i] for i in range(1, m)],
AllDiff(distance),
marks[0] == 0, # symmetry breaking
[distance[i * (i - 1) / 2 + j] >= ruler[i - j] for i in range(1, m) for j in range(0, i - 1) if (i - j < m)]
)
return marks, model
def solve(param):
marks, model = get_model(param)
solver = model.load(param['solver'], marks)
solver.setHeuristic(param['heuristic'])
solver.setVerbosity(param['verbose'])
solver.setTimeLimit(param['tcutoff'])
solver.solve()
out = ''
if solver.is_sat():
out = str(marks)
out += ('\nNodes: ' + str(solver.getNodes()))
return out
ruler = (0, 1, 3, 6, 11, 17, 25, 34, 44, 55, 72, 85, 106, 127)
default = {'solver': 'Mistral', 'marks': 6, 'heuristic': 'Impact', 'verbose': 0, 'tcutoff': 60}
if __name__ == '__main__':
param = input(default)
print solve(param)
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