tsp.py
#!/usr/bin/python
# Copyright 2013, Gurobi Optimization, Inc.
# Solve a traveling salesman problem on a randomly generated set of
# points using lazy constraints. The base MIP model only includes
# 'degree-2' constraints, requiring each node to have exactly
# two incident edges. Solutions to this model may contain subtours -
# tours that don't visit every city. The lazy constraint callback
# adds new constraints to cut them off.
import sys
import math
import random
from gurobipy import *
# Callback - use lazy constraints to eliminate sub-tours
def subtourelim(model, where):
if where == GRB.callback.MIPSOL:
selected = []
# make a list of edges selected in the solution
for i in range(n):
sol = model.cbGetSolution([model._vars[i,j] for j in range(n)])
selected += [(i,j) for j in range(n) if sol[j] > 0.5]
# find the shortest cycle in the selected edge list
tour = subtour(selected)
if len(tour) < n:
# add a subtour elimination constraint
expr = 0
for i in range(len(tour)):
for j in range(i+1, len(tour)):
expr += model._vars[tour[i], tour[j]]
model.cbLazy(expr <= len(tour)-1)
# Euclidean distance between two points
def distance(points, i, j):
dx = points[i][0] - points[j][0]
dy = points[i][1] - points[j][1]
return math.sqrt(dx*dx + dy*dy)
# Given a list of edges, finds the shortest subtour
def subtour(edges):
visited = [False]*n
cycles = []
lengths = []
selected = [[] for i in range(n)]
for x,y in edges:
selected[x].append(y)
while True:
current = visited.index(False)
thiscycle = [current]
while True:
visited[current] = True
neighbors = [x for x in selected[current] if not visited[x]]
if len(neighbors) == 0:
break
current = neighbors[0]
thiscycle.append(current)
cycles.append(thiscycle)
lengths.append(len(thiscycle))
if sum(lengths) == n:
break
return cycles[lengths.index(min(lengths))]
# Parse argument
if len(sys.argv) < 2:
print 'Usage: tsp.py npoints'
exit(1)
n = int(sys.argv[1])
# Create n random points
random.seed(1)
points = []
for i in range(n):
points.append((random.randint(0,100),random.randint(0,100)))
m = Model()
# Create variables
vars = {}
for i in range(n):
for j in range(i+1):
vars[i,j] = m.addVar(obj=distance(points, i, j), vtype=GRB.BINARY,
name='e'+str(i)+'_'+str(j))
vars[j,i] = vars[i,j]
m.update()
# Add degree-2 constraint, and forbid loops
for i in range(n):
m.addConstr(quicksum(vars[i,j] for j in range(n)) == 2)
vars[i,i].ub = 0
m.update()
# Optimize model
m._vars = vars
m.params.LazyConstraints = 1
m.optimize(subtourelim)
solution = m.getAttr('x', vars)
selected = [(i,j) for i in range(n) for j in range(n) if solution[i,j] > 0.5]
assert len(subtour(selected)) == n
print
print 'Optimal tour:', subtour(selected)
print 'Optimal cost:', m.objVal
print
