3

Am I doing something wrong or it is a bug?

c = np.array([-1.,  0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.])
A_ub = np.array([[   1., -724.,  911., -551., -555., -896.,  478.,  -80., -293.],
       [   1.,  566.,   42.,  937.,  233.,  883.,  392., -909.,   57.],
       [   1., -208., -894.,  539.,  321.,  532., -924.,  942.,   55.],
       [   1.,  857., -859.,   83.,  462., -265., -971.,  826.,  482.],
       [   1.,  314., -424.,  245., -424.,  194., -443., -104., -429.],
       [   1.,  540.,  679.,  361.,  149., -827.,  876.,  633.,  302.],
       [   0.,   -1.,   -0.,   -0.,   -0.,   -0.,   -0.,   -0.,   -0.],
       [   0.,   -0.,   -1.,   -0.,   -0.,   -0.,   -0.,   -0.,   -0.],
       [   0.,   -0.,   -0.,   -1.,   -0.,   -0.,   -0.,   -0.,   -0.],
       [   0.,   -0.,   -0.,   -0.,   -1.,   -0.,   -0.,   -0.,   -0.],
       [   0.,   -0.,   -0.,   -0.,   -0.,   -1.,   -0.,   -0.,   -0.],
       [   0.,   -0.,   -0.,   -0.,   -0.,   -0.,   -1.,   -0.,   -0.],
       [   0.,   -0.,   -0.,   -0.,   -0.,   -0.,   -0.,   -1.,   -0.],
       [   0.,   -0.,   -0.,   -0.,   -0.,   -0.,   -0.,   -0.,   -1.],
       [   0.,    1.,    0.,    0.,    0.,    0.,    0.,    0.,    0.],
       [   0.,    0.,    1.,    0.,    0.,    0.,    0.,    0.,    0.],
       [   0.,    0.,    0.,    1.,    0.,    0.,    0.,    0.,    0.],
       [   0.,    0.,    0.,    0.,    1.,    0.,    0.,    0.,    0.],
       [   0.,    0.,    0.,    0.,    0.,    1.,    0.,    0.,    0.],
       [   0.,    0.,    0.,    0.,    0.,    0.,    1.,    0.,    0.],
       [   0.,    0.,    0.,    0.,    0.,    0.,    0.,    1.,    0.],
       [   0.,    0.,    0.,    0.,    0.,    0.,    0.,    0.,    1.]])
b_ub = np.array([ 0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.,  0., 
                 0., 0.,  1.,  1.,  1.,  1.,  1.,  1.,  1.,  1.])
A_eq = np.array([[ 0.,  1.,  1.,  1.,  1.,  1.,  1.,  1.,  1.]])
b_eq = np.array([[ 1.]])
bounds = [(None, None), (None, None), (None, None), (None, None), (None, None), 
         (None, None), (None, None), (None, None), (None, None)]

soln = scipy.optimize.linprog(c, A_ub, b_ub, A_eq, b_eq, bounds)
print(soln)
print(A_ub.dot(soln['x']) <= b_ub)
print(A_ub.dot(soln['x']) - b_ub)
print(abs(A_eq.dot(soln['x']) - b_eq))](url)

outputs

     fun: 39.866871820032244
 message: 'Optimization terminated successfully.'
     nit: 19
   slack: array([   0.   ,    0.   ,    0.   ,    0.   ,  365.161,    0.   ,
          0.   ,    0.   ,    0.   ,    0.   ,    0.167,    0.61 ,
          0.115,    0.518,    1.   ,    1.   ,    1.   ,    1.   ,
          0.833,    0.39 ,    0.885,    0.482])
  status: 0
 success: True
       x: array([-39.812,  -0.281,  -0.625,   0.   ,  -0.031,  -0.125,   0.625,
         0.312,   0.406])

[ True  True False False  True False False False  True False False  True
  True  True  True  True  True  True  True  True  True  True]
[-121.5   -358.812  240.125  121.781 -357.781  350.656    0.281    0.625
    0.       0.031    0.125   -0.625   -0.312   -0.406   -1.281   -1.625
   -1.      -1.031   -1.125   -0.375   -0.688   -0.594]
[[ 0.719]]

From middle part of A_ub that must be clear that solution must satisfy soln['x'][1:] > 0, however, it is clearly not satisfied!

Am I doing something wrong?

Python 3.6 scipy==0.18.1

1 Answer 1

4

Yes, it looks like a bug. I usually recommend people to use alternatives to scipy's linprog because:

  • bad robustness
  • bad performance (especially on big sparse problems)
  • does not seem to be maintained anymore; not much progress despite open issues

There is currently an interior-point-based solver in development for scipy, which solves this problem correctly. Of course you can also use the much better alternatives available (e.g. through cvxpy).

Here is some code, which shows, that cvxpy's default solver (for these kind of problems; ECOS can solve a much broader class of problems!) ECOS and the not yet incorporated IPM-solver solve it, while linprog-simplex struggles. Keep in mind, that the code will not run on vanilla-scipy as method='interior-point' is missing:

import numpy as np
from scipy.optimize import linprog

c = np.array([-1.,  0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.])
A_ub = np.array([[   1., -724.,  911., -551., -555., -896.,  478.,  -80., -293.],
       [   1.,  566.,   42.,  937.,  233.,  883.,  392., -909.,   57.],
       [   1., -208., -894.,  539.,  321.,  532., -924.,  942.,   55.],
       [   1.,  857., -859.,   83.,  462., -265., -971.,  826.,  482.],
       [   1.,  314., -424.,  245., -424.,  194., -443., -104., -429.],
       [   1.,  540.,  679.,  361.,  149., -827.,  876.,  633.,  302.],
       [   0.,   -1.,   -0.,   -0.,   -0.,   -0.,   -0.,   -0.,   -0.],
       [   0.,   -0.,   -1.,   -0.,   -0.,   -0.,   -0.,   -0.,   -0.],
       [   0.,   -0.,   -0.,   -1.,   -0.,   -0.,   -0.,   -0.,   -0.],
       [   0.,   -0.,   -0.,   -0.,   -1.,   -0.,   -0.,   -0.,   -0.],
       [   0.,   -0.,   -0.,   -0.,   -0.,   -1.,   -0.,   -0.,   -0.],
       [   0.,   -0.,   -0.,   -0.,   -0.,   -0.,   -1.,   -0.,   -0.],
       [   0.,   -0.,   -0.,   -0.,   -0.,   -0.,   -0.,   -1.,   -0.],
       [   0.,   -0.,   -0.,   -0.,   -0.,   -0.,   -0.,   -0.,   -1.],
       [   0.,    1.,    0.,    0.,    0.,    0.,    0.,    0.,    0.],
       [   0.,    0.,    1.,    0.,    0.,    0.,    0.,    0.,    0.],
       [   0.,    0.,    0.,    1.,    0.,    0.,    0.,    0.,    0.],
       [   0.,    0.,    0.,    0.,    1.,    0.,    0.,    0.,    0.],
       [   0.,    0.,    0.,    0.,    0.,    1.,    0.,    0.,    0.],
       [   0.,    0.,    0.,    0.,    0.,    0.,    1.,    0.,    0.],
       [   0.,    0.,    0.,    0.,    0.,    0.,    0.,    1.,    0.],
       [   0.,    0.,    0.,    0.,    0.,    0.,    0.,    0.,    1.]])
b_ub = np.array([ 0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.,
                 0., 0.,  1.,  1.,  1.,  1.,  1.,  1.,  1.,  1.])
A_eq = np.array([[ 0.,  1.,  1.,  1.,  1.,  1.,  1.,  1.,  1.]])
b_eq = np.array([[ 1.]])
bounds = [(None, None), (None, None), (None, None), (None, None), (None, None),
         (None, None), (None, None), (None, None), (None, None)]

soln = linprog(c, A_ub, b_ub, A_eq, b_eq, bounds, method='simplex')
print('linprog: ', soln)

soln = linprog(c, A_ub, b_ub, A_eq, b_eq, bounds, method='interior-point')
print('linprog IPM: ', soln)

from cvxpy import *
x = Variable(A_eq.shape[1])
constraints = []
constraints.append(A_ub*x <= b_ub)
constraints.append(A_eq*x == b_eq)
objective = Minimize(c*x)
problem = Problem(objective, constraints)
problem.solve(verbose=True)
print(np.round(x.value, 2))
print(problem.value)

Output:

linprog:       fun: 39.866871820032244
 message: 'Optimization terminated successfully.'
     nit: 19
   slack: array([  0.00000000e+00,   0.00000000e+00,   0.00000000e+00,
         0.00000000e+00,   3.65161351e+02,   0.00000000e+00,
         0.00000000e+00,   0.00000000e+00,   0.00000000e+00,
         0.00000000e+00,   1.66922982e-01,   6.10104031e-01,
         1.14953670e-01,   5.18298274e-01,   1.00000000e+00,
         1.00000000e+00,   1.00000000e+00,   1.00000000e+00,
         8.33077018e-01,   3.89895969e-01,   8.85046330e-01,
         4.81701726e-01])
  status: 0
 success: True
       x: array([ -3.98125000e+01,  -2.81250000e-01,  -6.25000000e-01,
         0.00000000e+00,  -3.12500000e-02,  -1.25000000e-01,
         6.25000000e-01,   3.12500000e-01,   4.06250000e-01])
linprog IPM:       con: array([ -3.93646007e-08])
     fun: 108.56853369114262
 message: 'Optimization terminated successfully.'
     nit: 9
   slack: array([  1.23442489e+02,  -1.13909794e-05,  -7.46066462e-07,
         3.12539380e+02,   2.20799190e+02,  -1.41898576e-05,
         2.48742446e-09,   3.71114180e-01,   1.07937459e-09,
         1.33093066e-08,   3.70892271e-01,   2.03637625e-09,
         2.57993546e-01,   2.36290348e-08,   9.99999998e-01,
         6.28885820e-01,   9.99999999e-01,   9.99999987e-01,
         6.29107729e-01,   9.99999998e-01,   7.42006454e-01,
         9.99999976e-01])
  status: 0
 success: True
       x: array([ -1.08568534e+02,   2.48742446e-09,   3.71114180e-01,
         1.07937459e-09,   1.33093066e-08,   3.70892271e-01,
         2.03637625e-09,   2.57993546e-01,   2.36290348e-08])

ECOS 2.0.4 - (C) embotech GmbH, Zurich Switzerland, 2012-15. Web: www.embotech.com/ECOS

It     pcost       dcost      gap   pres   dres    k/t    mu     step   sigma     IR    |   BT
 0  +2.934e+01  -6.533e+02  +2e+03  3e-01  5e-01  1e+00  8e+01    ---    ---    1  1  - |  -  - 
 1  +9.527e+01  -1.952e+02  +9e+02  1e-01  2e-01  8e+00  4e+01  0.6128  2e-01   1  1  1 |  0  0
 2  +9.281e+01  -1.256e+01  +3e+02  4e-02  6e-02  5e+00  1e+01  0.6888  1e-01   1  1  1 |  0  0
 3  +1.004e+02  +6.363e+01  +1e+02  2e-02  2e-02  2e+00  5e+00  0.7367  1e-01   1  1  1 |  0  0
 4  +1.075e+02  +9.684e+01  +3e+01  5e-03  6e-03  9e-01  1e+00  0.8307  1e-01   1  1  1 |  0  0
 5  +1.086e+02  +1.084e+02  +4e-01  6e-05  7e-05  1e-02  2e-02  0.9872  1e-04   1  1  1 |  0  0
 6  +1.086e+02  +1.086e+02  +5e-03  7e-07  8e-07  1e-04  2e-04  0.9890  1e-04   1  1  1 |  0  0
 7  +1.086e+02  +1.086e+02  +5e-05  8e-09  9e-09  1e-06  2e-06  0.9890  1e-04   1  0  0 |  0  0
 8  +1.086e+02  +1.086e+02  +6e-07  8e-11  1e-10  2e-08  3e-08  0.9890  1e-04   1  0  0 |  0  0

OPTIMAL (within feastol=9.6e-11, reltol=5.2e-09, abstol=5.6e-07).
Runtime: 0.000424 seconds.

[[-108.57]
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108.56853545568384

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