Generating some random Gaussian coordinates, I noticed the TSP-solver returns horrible solutions, however it also returns the same horrible solution over and over again for the same input.

Given this code:

import numpy
import math
from ortools.constraint_solver import pywrapcp
from ortools.constraint_solver import routing_enums_pb2

import matplotlib
%matplotlib inline
from matplotlib import pyplot, pylab
pylab.rcParams['figure.figsize'] = 20, 10

n_points = 200

orders = numpy.random.randn(n_points, 2)
coordinates = orders.tolist()

class Distance:
    def __init__(self, coords):
        self.coords = coords

    def distance(self, x, y):
        return math.sqrt((x[0] - y[0]) ** 2 + (x[1] - y[1]) ** 2)

    def __call__(self, x, y):
        return self.distance(self.coords[x], self.coords[y])

distance = Distance(coordinates)

search_parameters = pywrapcp.RoutingModel.DefaultSearchParameters()
search_parameters.first_solution_strategy = (

search_parameters.local_search_metaheuristic = routing_enums_pb2.LocalSearchMetaheuristic.TABU_SEARCH

routing = pywrapcp.RoutingModel(len(coordinates), 1)

solver = routing.solver()
routing.CloseModel() # the documentation is a bit unclear on whether this is needed

assignment = routing.SolveWithParameters(search_parameters)

nodes = []
index = routing.Start(0)
while not routing.IsEnd(index):
    index = assignment.Value(routing.NextVar(index))

for (a, b) in zip(nodes, nodes[1:]):
    a, b = coordinates[a], coordinates[b]
    pyplot.plot([a[0], b[0]], [a[1], b[1]], 'r' )

For example, for 10 points I get a nice solution:

enter image description here

For 20 It's worse, some obvious optimizations still exist (where one only would need to swap two points.

enter image description here

And for 200 it's horrible:

enter image description here

I'm wondering whether the code above actually does some LNS, or just returns the initial value, especially since most first_solution_strategy options suggest deterministic initialization.

Why does the TSP-solver above return consistent solutions for the same data, even though tabu-search and simulated annealing and such are stochastic. And, why is the 200-point solution so bad?

I played with several options in SearchParameters, especially enabling 'use_...' fields in local_search_operators. This had no effect, the same very sub-optimal solutions were returned.


I think the problem is with the distance-measure :). I can remember a kScalingFactor in the C-code samples from or-tools, which was used to scale up distances, and then round (by casting) them to integers: or-tools expects distances to be integers.

Or course, distances between standard Gaussian random coordinates typically lie between 0 and maybe 2, hence most point pairs have the same distances when mapped to integers: garbage in, garbage out.

I fixed it by simply multiplying and casting to integers (just to be sure swig won't interpreter the floats as integers):

# ...
def distance(self, x, y):
    return int(10000 * math.sqrt((x[0] - y[0]) ** 2 + (x[1] - y[1]) ** 2))
# ...

Then the results make a lot more sense:

10 points:

10 points

20 points:

20 points

200 points:

200 points

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