peacock-data-public-datasets-idc-cronscript
/
venv
/lib
/python3.10
/site-packages
/scipy
/optimize
/_linprog_simplex.py
| """Simplex method for linear programming | |
| The *simplex* method uses a traditional, full-tableau implementation of | |
| Dantzig's simplex algorithm [1]_, [2]_ (*not* the Nelder-Mead simplex). | |
| This algorithm is included for backwards compatibility and educational | |
| purposes. | |
| .. versionadded:: 0.15.0 | |
| Warnings | |
| -------- | |
| The simplex method may encounter numerical difficulties when pivot | |
| values are close to the specified tolerance. If encountered try | |
| remove any redundant constraints, change the pivot strategy to Bland's | |
| rule or increase the tolerance value. | |
| Alternatively, more robust methods maybe be used. See | |
| :ref:`'interior-point' <optimize.linprog-interior-point>` and | |
| :ref:`'revised simplex' <optimize.linprog-revised_simplex>`. | |
| References | |
| ---------- | |
| .. [1] Dantzig, George B., Linear programming and extensions. Rand | |
| Corporation Research Study Princeton Univ. Press, Princeton, NJ, | |
| 1963 | |
| .. [2] Hillier, S.H. and Lieberman, G.J. (1995), "Introduction to | |
| Mathematical Programming", McGraw-Hill, Chapter 4. | |
| """ | |
| import numpy as np | |
| from warnings import warn | |
| from ._optimize import OptimizeResult, OptimizeWarning, _check_unknown_options | |
| from ._linprog_util import _postsolve | |
| def _pivot_col(T, tol=1e-9, bland=False): | |
| """ | |
| Given a linear programming simplex tableau, determine the column | |
| of the variable to enter the basis. | |
| Parameters | |
| ---------- | |
| T : 2-D array | |
| A 2-D array representing the simplex tableau, T, corresponding to the | |
| linear programming problem. It should have the form: | |
| [[A[0, 0], A[0, 1], ..., A[0, n_total], b[0]], | |
| [A[1, 0], A[1, 1], ..., A[1, n_total], b[1]], | |
| . | |
| . | |
| . | |
| [A[m, 0], A[m, 1], ..., A[m, n_total], b[m]], | |
| [c[0], c[1], ..., c[n_total], 0]] | |
| for a Phase 2 problem, or the form: | |
| [[A[0, 0], A[0, 1], ..., A[0, n_total], b[0]], | |
| [A[1, 0], A[1, 1], ..., A[1, n_total], b[1]], | |
| . | |
| . | |
| . | |
| [A[m, 0], A[m, 1], ..., A[m, n_total], b[m]], | |
| [c[0], c[1], ..., c[n_total], 0], | |
| [c'[0], c'[1], ..., c'[n_total], 0]] | |
| for a Phase 1 problem (a problem in which a basic feasible solution is | |
| sought prior to maximizing the actual objective. ``T`` is modified in | |
| place by ``_solve_simplex``. | |
| tol : float | |
| Elements in the objective row larger than -tol will not be considered | |
| for pivoting. Nominally this value is zero, but numerical issues | |
| cause a tolerance about zero to be necessary. | |
| bland : bool | |
| If True, use Bland's rule for selection of the column (select the | |
| first column with a negative coefficient in the objective row, | |
| regardless of magnitude). | |
| Returns | |
| ------- | |
| status: bool | |
| True if a suitable pivot column was found, otherwise False. | |
| A return of False indicates that the linear programming simplex | |
| algorithm is complete. | |
| col: int | |
| The index of the column of the pivot element. | |
| If status is False, col will be returned as nan. | |
| """ | |
| ma = np.ma.masked_where(T[-1, :-1] >= -tol, T[-1, :-1], copy=False) | |
| if ma.count() == 0: | |
| return False, np.nan | |
| if bland: | |
| # ma.mask is sometimes 0d | |
| return True, np.nonzero(np.logical_not(np.atleast_1d(ma.mask)))[0][0] | |
| return True, np.ma.nonzero(ma == ma.min())[0][0] | |
| def _pivot_row(T, basis, pivcol, phase, tol=1e-9, bland=False): | |
| """ | |
| Given a linear programming simplex tableau, determine the row for the | |
| pivot operation. | |
| Parameters | |
| ---------- | |
| T : 2-D array | |
| A 2-D array representing the simplex tableau, T, corresponding to the | |
| linear programming problem. It should have the form: | |
| [[A[0, 0], A[0, 1], ..., A[0, n_total], b[0]], | |
| [A[1, 0], A[1, 1], ..., A[1, n_total], b[1]], | |
| . | |
| . | |
| . | |
| [A[m, 0], A[m, 1], ..., A[m, n_total], b[m]], | |
| [c[0], c[1], ..., c[n_total], 0]] | |
| for a Phase 2 problem, or the form: | |
| [[A[0, 0], A[0, 1], ..., A[0, n_total], b[0]], | |
| [A[1, 0], A[1, 1], ..., A[1, n_total], b[1]], | |
| . | |
| . | |
| . | |
| [A[m, 0], A[m, 1], ..., A[m, n_total], b[m]], | |
| [c[0], c[1], ..., c[n_total], 0], | |
| [c'[0], c'[1], ..., c'[n_total], 0]] | |
| for a Phase 1 problem (a Problem in which a basic feasible solution is | |
| sought prior to maximizing the actual objective. ``T`` is modified in | |
| place by ``_solve_simplex``. | |
| basis : array | |
| A list of the current basic variables. | |
| pivcol : int | |
| The index of the pivot column. | |
| phase : int | |
| The phase of the simplex algorithm (1 or 2). | |
| tol : float | |
| Elements in the pivot column smaller than tol will not be considered | |
| for pivoting. Nominally this value is zero, but numerical issues | |
| cause a tolerance about zero to be necessary. | |
| bland : bool | |
| If True, use Bland's rule for selection of the row (if more than one | |
| row can be used, choose the one with the lowest variable index). | |
| Returns | |
| ------- | |
| status: bool | |
| True if a suitable pivot row was found, otherwise False. A return | |
| of False indicates that the linear programming problem is unbounded. | |
| row: int | |
| The index of the row of the pivot element. If status is False, row | |
| will be returned as nan. | |
| """ | |
| if phase == 1: | |
| k = 2 | |
| else: | |
| k = 1 | |
| ma = np.ma.masked_where(T[:-k, pivcol] <= tol, T[:-k, pivcol], copy=False) | |
| if ma.count() == 0: | |
| return False, np.nan | |
| mb = np.ma.masked_where(T[:-k, pivcol] <= tol, T[:-k, -1], copy=False) | |
| q = mb / ma | |
| min_rows = np.ma.nonzero(q == q.min())[0] | |
| if bland: | |
| return True, min_rows[np.argmin(np.take(basis, min_rows))] | |
| return True, min_rows[0] | |
| def _apply_pivot(T, basis, pivrow, pivcol, tol=1e-9): | |
| """ | |
| Pivot the simplex tableau inplace on the element given by (pivrow, pivol). | |
| The entering variable corresponds to the column given by pivcol forcing | |
| the variable basis[pivrow] to leave the basis. | |
| Parameters | |
| ---------- | |
| T : 2-D array | |
| A 2-D array representing the simplex tableau, T, corresponding to the | |
| linear programming problem. It should have the form: | |
| [[A[0, 0], A[0, 1], ..., A[0, n_total], b[0]], | |
| [A[1, 0], A[1, 1], ..., A[1, n_total], b[1]], | |
| . | |
| . | |
| . | |
| [A[m, 0], A[m, 1], ..., A[m, n_total], b[m]], | |
| [c[0], c[1], ..., c[n_total], 0]] | |
| for a Phase 2 problem, or the form: | |
| [[A[0, 0], A[0, 1], ..., A[0, n_total], b[0]], | |
| [A[1, 0], A[1, 1], ..., A[1, n_total], b[1]], | |
| . | |
| . | |
| . | |
| [A[m, 0], A[m, 1], ..., A[m, n_total], b[m]], | |
| [c[0], c[1], ..., c[n_total], 0], | |
| [c'[0], c'[1], ..., c'[n_total], 0]] | |
| for a Phase 1 problem (a problem in which a basic feasible solution is | |
| sought prior to maximizing the actual objective. ``T`` is modified in | |
| place by ``_solve_simplex``. | |
| basis : 1-D array | |
| An array of the indices of the basic variables, such that basis[i] | |
| contains the column corresponding to the basic variable for row i. | |
| Basis is modified in place by _apply_pivot. | |
| pivrow : int | |
| Row index of the pivot. | |
| pivcol : int | |
| Column index of the pivot. | |
| """ | |
| basis[pivrow] = pivcol | |
| pivval = T[pivrow, pivcol] | |
| T[pivrow] = T[pivrow] / pivval | |
| for irow in range(T.shape[0]): | |
| if irow != pivrow: | |
| T[irow] = T[irow] - T[pivrow] * T[irow, pivcol] | |
| # The selected pivot should never lead to a pivot value less than the tol. | |
| if np.isclose(pivval, tol, atol=0, rtol=1e4): | |
| message = ( | |
| f"The pivot operation produces a pivot value of:{pivval: .1e}, " | |
| "which is only slightly greater than the specified " | |
| f"tolerance{tol: .1e}. This may lead to issues regarding the " | |
| "numerical stability of the simplex method. " | |
| "Removing redundant constraints, changing the pivot strategy " | |
| "via Bland's rule or increasing the tolerance may " | |
| "help reduce the issue.") | |
| warn(message, OptimizeWarning, stacklevel=5) | |
| def _solve_simplex(T, n, basis, callback, postsolve_args, | |
| maxiter=1000, tol=1e-9, phase=2, bland=False, nit0=0, | |
| ): | |
| """ | |
| Solve a linear programming problem in "standard form" using the Simplex | |
| Method. Linear Programming is intended to solve the following problem form: | |
| Minimize:: | |
| c @ x | |
| Subject to:: | |
| A @ x == b | |
| x >= 0 | |
| Parameters | |
| ---------- | |
| T : 2-D array | |
| A 2-D array representing the simplex tableau, T, corresponding to the | |
| linear programming problem. It should have the form: | |
| [[A[0, 0], A[0, 1], ..., A[0, n_total], b[0]], | |
| [A[1, 0], A[1, 1], ..., A[1, n_total], b[1]], | |
| . | |
| . | |
| . | |
| [A[m, 0], A[m, 1], ..., A[m, n_total], b[m]], | |
| [c[0], c[1], ..., c[n_total], 0]] | |
| for a Phase 2 problem, or the form: | |
| [[A[0, 0], A[0, 1], ..., A[0, n_total], b[0]], | |
| [A[1, 0], A[1, 1], ..., A[1, n_total], b[1]], | |
| . | |
| . | |
| . | |
| [A[m, 0], A[m, 1], ..., A[m, n_total], b[m]], | |
| [c[0], c[1], ..., c[n_total], 0], | |
| [c'[0], c'[1], ..., c'[n_total], 0]] | |
| for a Phase 1 problem (a problem in which a basic feasible solution is | |
| sought prior to maximizing the actual objective. ``T`` is modified in | |
| place by ``_solve_simplex``. | |
| n : int | |
| The number of true variables in the problem. | |
| basis : 1-D array | |
| An array of the indices of the basic variables, such that basis[i] | |
| contains the column corresponding to the basic variable for row i. | |
| Basis is modified in place by _solve_simplex | |
| callback : callable, optional | |
| If a callback function is provided, it will be called within each | |
| iteration of the algorithm. The callback must accept a | |
| `scipy.optimize.OptimizeResult` consisting of the following fields: | |
| x : 1-D array | |
| Current solution vector | |
| fun : float | |
| Current value of the objective function | |
| success : bool | |
| True only when a phase has completed successfully. This | |
| will be False for most iterations. | |
| slack : 1-D array | |
| The values of the slack variables. Each slack variable | |
| corresponds to an inequality constraint. If the slack is zero, | |
| the corresponding constraint is active. | |
| con : 1-D array | |
| The (nominally zero) residuals of the equality constraints, | |
| that is, ``b - A_eq @ x`` | |
| phase : int | |
| The phase of the optimization being executed. In phase 1 a basic | |
| feasible solution is sought and the T has an additional row | |
| representing an alternate objective function. | |
| status : int | |
| An integer representing the exit status of the optimization:: | |
| 0 : Optimization terminated successfully | |
| 1 : Iteration limit reached | |
| 2 : Problem appears to be infeasible | |
| 3 : Problem appears to be unbounded | |
| 4 : Serious numerical difficulties encountered | |
| nit : int | |
| The number of iterations performed. | |
| message : str | |
| A string descriptor of the exit status of the optimization. | |
| postsolve_args : tuple | |
| Data needed by _postsolve to convert the solution to the standard-form | |
| problem into the solution to the original problem. | |
| maxiter : int | |
| The maximum number of iterations to perform before aborting the | |
| optimization. | |
| tol : float | |
| The tolerance which determines when a solution is "close enough" to | |
| zero in Phase 1 to be considered a basic feasible solution or close | |
| enough to positive to serve as an optimal solution. | |
| phase : int | |
| The phase of the optimization being executed. In phase 1 a basic | |
| feasible solution is sought and the T has an additional row | |
| representing an alternate objective function. | |
| bland : bool | |
| If True, choose pivots using Bland's rule [3]_. In problems which | |
| fail to converge due to cycling, using Bland's rule can provide | |
| convergence at the expense of a less optimal path about the simplex. | |
| nit0 : int | |
| The initial iteration number used to keep an accurate iteration total | |
| in a two-phase problem. | |
| Returns | |
| ------- | |
| nit : int | |
| The number of iterations. Used to keep an accurate iteration total | |
| in the two-phase problem. | |
| status : int | |
| An integer representing the exit status of the optimization:: | |
| 0 : Optimization terminated successfully | |
| 1 : Iteration limit reached | |
| 2 : Problem appears to be infeasible | |
| 3 : Problem appears to be unbounded | |
| 4 : Serious numerical difficulties encountered | |
| """ | |
| nit = nit0 | |
| status = 0 | |
| message = '' | |
| complete = False | |
| if phase == 1: | |
| m = T.shape[1]-2 | |
| elif phase == 2: | |
| m = T.shape[1]-1 | |
| else: | |
| raise ValueError("Argument 'phase' to _solve_simplex must be 1 or 2") | |
| if phase == 2: | |
| # Check if any artificial variables are still in the basis. | |
| # If yes, check if any coefficients from this row and a column | |
| # corresponding to one of the non-artificial variable is non-zero. | |
| # If found, pivot at this term. If not, start phase 2. | |
| # Do this for all artificial variables in the basis. | |
| # Ref: "An Introduction to Linear Programming and Game Theory" | |
| # by Paul R. Thie, Gerard E. Keough, 3rd Ed, | |
| # Chapter 3.7 Redundant Systems (pag 102) | |
| for pivrow in [row for row in range(basis.size) | |
| if basis[row] > T.shape[1] - 2]: | |
| non_zero_row = [col for col in range(T.shape[1] - 1) | |
| if abs(T[pivrow, col]) > tol] | |
| if len(non_zero_row) > 0: | |
| pivcol = non_zero_row[0] | |
| _apply_pivot(T, basis, pivrow, pivcol, tol) | |
| nit += 1 | |
| if len(basis[:m]) == 0: | |
| solution = np.empty(T.shape[1] - 1, dtype=np.float64) | |
| else: | |
| solution = np.empty(max(T.shape[1] - 1, max(basis[:m]) + 1), | |
| dtype=np.float64) | |
| while not complete: | |
| # Find the pivot column | |
| pivcol_found, pivcol = _pivot_col(T, tol, bland) | |
| if not pivcol_found: | |
| pivcol = np.nan | |
| pivrow = np.nan | |
| status = 0 | |
| complete = True | |
| else: | |
| # Find the pivot row | |
| pivrow_found, pivrow = _pivot_row(T, basis, pivcol, phase, tol, bland) | |
| if not pivrow_found: | |
| status = 3 | |
| complete = True | |
| if callback is not None: | |
| solution[:] = 0 | |
| solution[basis[:n]] = T[:n, -1] | |
| x = solution[:m] | |
| x, fun, slack, con = _postsolve( | |
| x, postsolve_args | |
| ) | |
| res = OptimizeResult({ | |
| 'x': x, | |
| 'fun': fun, | |
| 'slack': slack, | |
| 'con': con, | |
| 'status': status, | |
| 'message': message, | |
| 'nit': nit, | |
| 'success': status == 0 and complete, | |
| 'phase': phase, | |
| 'complete': complete, | |
| }) | |
| callback(res) | |
| if not complete: | |
| if nit >= maxiter: | |
| # Iteration limit exceeded | |
| status = 1 | |
| complete = True | |
| else: | |
| _apply_pivot(T, basis, pivrow, pivcol, tol) | |
| nit += 1 | |
| return nit, status | |
| def _linprog_simplex(c, c0, A, b, callback, postsolve_args, | |
| maxiter=1000, tol=1e-9, disp=False, bland=False, | |
| **unknown_options): | |
| """ | |
| Minimize a linear objective function subject to linear equality and | |
| non-negativity constraints using the two phase simplex method. | |
| Linear programming is intended to solve problems of the following form: | |
| Minimize:: | |
| c @ x | |
| Subject to:: | |
| A @ x == b | |
| x >= 0 | |
| User-facing documentation is in _linprog_doc.py. | |
| Parameters | |
| ---------- | |
| c : 1-D array | |
| Coefficients of the linear objective function to be minimized. | |
| c0 : float | |
| Constant term in objective function due to fixed (and eliminated) | |
| variables. (Purely for display.) | |
| A : 2-D array | |
| 2-D array such that ``A @ x``, gives the values of the equality | |
| constraints at ``x``. | |
| b : 1-D array | |
| 1-D array of values representing the right hand side of each equality | |
| constraint (row) in ``A``. | |
| callback : callable, optional | |
| If a callback function is provided, it will be called within each | |
| iteration of the algorithm. The callback function must accept a single | |
| `scipy.optimize.OptimizeResult` consisting of the following fields: | |
| x : 1-D array | |
| Current solution vector | |
| fun : float | |
| Current value of the objective function | |
| success : bool | |
| True when an algorithm has completed successfully. | |
| slack : 1-D array | |
| The values of the slack variables. Each slack variable | |
| corresponds to an inequality constraint. If the slack is zero, | |
| the corresponding constraint is active. | |
| con : 1-D array | |
| The (nominally zero) residuals of the equality constraints, | |
| that is, ``b - A_eq @ x`` | |
| phase : int | |
| The phase of the algorithm being executed. | |
| status : int | |
| An integer representing the status of the optimization:: | |
| 0 : Algorithm proceeding nominally | |
| 1 : Iteration limit reached | |
| 2 : Problem appears to be infeasible | |
| 3 : Problem appears to be unbounded | |
| 4 : Serious numerical difficulties encountered | |
| nit : int | |
| The number of iterations performed. | |
| message : str | |
| A string descriptor of the exit status of the optimization. | |
| postsolve_args : tuple | |
| Data needed by _postsolve to convert the solution to the standard-form | |
| problem into the solution to the original problem. | |
| Options | |
| ------- | |
| maxiter : int | |
| The maximum number of iterations to perform. | |
| disp : bool | |
| If True, print exit status message to sys.stdout | |
| tol : float | |
| The tolerance which determines when a solution is "close enough" to | |
| zero in Phase 1 to be considered a basic feasible solution or close | |
| enough to positive to serve as an optimal solution. | |
| bland : bool | |
| If True, use Bland's anti-cycling rule [3]_ to choose pivots to | |
| prevent cycling. If False, choose pivots which should lead to a | |
| converged solution more quickly. The latter method is subject to | |
| cycling (non-convergence) in rare instances. | |
| unknown_options : dict | |
| Optional arguments not used by this particular solver. If | |
| `unknown_options` is non-empty a warning is issued listing all | |
| unused options. | |
| Returns | |
| ------- | |
| x : 1-D array | |
| Solution vector. | |
| status : int | |
| An integer representing the exit status of the optimization:: | |
| 0 : Optimization terminated successfully | |
| 1 : Iteration limit reached | |
| 2 : Problem appears to be infeasible | |
| 3 : Problem appears to be unbounded | |
| 4 : Serious numerical difficulties encountered | |
| message : str | |
| A string descriptor of the exit status of the optimization. | |
| iteration : int | |
| The number of iterations taken to solve the problem. | |
| References | |
| ---------- | |
| .. [1] Dantzig, George B., Linear programming and extensions. Rand | |
| Corporation Research Study Princeton Univ. Press, Princeton, NJ, | |
| 1963 | |
| .. [2] Hillier, S.H. and Lieberman, G.J. (1995), "Introduction to | |
| Mathematical Programming", McGraw-Hill, Chapter 4. | |
| .. [3] Bland, Robert G. New finite pivoting rules for the simplex method. | |
| Mathematics of Operations Research (2), 1977: pp. 103-107. | |
| Notes | |
| ----- | |
| The expected problem formulation differs between the top level ``linprog`` | |
| module and the method specific solvers. The method specific solvers expect a | |
| problem in standard form: | |
| Minimize:: | |
| c @ x | |
| Subject to:: | |
| A @ x == b | |
| x >= 0 | |
| Whereas the top level ``linprog`` module expects a problem of form: | |
| Minimize:: | |
| c @ x | |
| Subject to:: | |
| A_ub @ x <= b_ub | |
| A_eq @ x == b_eq | |
| lb <= x <= ub | |
| where ``lb = 0`` and ``ub = None`` unless set in ``bounds``. | |
| The original problem contains equality, upper-bound and variable constraints | |
| whereas the method specific solver requires equality constraints and | |
| variable non-negativity. | |
| ``linprog`` module converts the original problem to standard form by | |
| converting the simple bounds to upper bound constraints, introducing | |
| non-negative slack variables for inequality constraints, and expressing | |
| unbounded variables as the difference between two non-negative variables. | |
| """ | |
| _check_unknown_options(unknown_options) | |
| status = 0 | |
| messages = {0: "Optimization terminated successfully.", | |
| 1: "Iteration limit reached.", | |
| 2: "Optimization failed. Unable to find a feasible" | |
| " starting point.", | |
| 3: "Optimization failed. The problem appears to be unbounded.", | |
| 4: "Optimization failed. Singular matrix encountered."} | |
| n, m = A.shape | |
| # All constraints must have b >= 0. | |
| is_negative_constraint = np.less(b, 0) | |
| A[is_negative_constraint] *= -1 | |
| b[is_negative_constraint] *= -1 | |
| # As all constraints are equality constraints the artificial variables | |
| # will also be basic variables. | |
| av = np.arange(n) + m | |
| basis = av.copy() | |
| # Format the phase one tableau by adding artificial variables and stacking | |
| # the constraints, the objective row and pseudo-objective row. | |
| row_constraints = np.hstack((A, np.eye(n), b[:, np.newaxis])) | |
| row_objective = np.hstack((c, np.zeros(n), c0)) | |
| row_pseudo_objective = -row_constraints.sum(axis=0) | |
| row_pseudo_objective[av] = 0 | |
| T = np.vstack((row_constraints, row_objective, row_pseudo_objective)) | |
| nit1, status = _solve_simplex(T, n, basis, callback=callback, | |
| postsolve_args=postsolve_args, | |
| maxiter=maxiter, tol=tol, phase=1, | |
| bland=bland | |
| ) | |
| # if pseudo objective is zero, remove the last row from the tableau and | |
| # proceed to phase 2 | |
| nit2 = nit1 | |
| if abs(T[-1, -1]) < tol: | |
| # Remove the pseudo-objective row from the tableau | |
| T = T[:-1, :] | |
| # Remove the artificial variable columns from the tableau | |
| T = np.delete(T, av, 1) | |
| else: | |
| # Failure to find a feasible starting point | |
| status = 2 | |
| messages[status] = ( | |
| "Phase 1 of the simplex method failed to find a feasible " | |
| "solution. The pseudo-objective function evaluates to {0:.1e} " | |
| "which exceeds the required tolerance of {1} for a solution to be " | |
| "considered 'close enough' to zero to be a basic solution. " | |
| "Consider increasing the tolerance to be greater than {0:.1e}. " | |
| "If this tolerance is unacceptably large the problem may be " | |
| "infeasible.".format(abs(T[-1, -1]), tol) | |
| ) | |
| if status == 0: | |
| # Phase 2 | |
| nit2, status = _solve_simplex(T, n, basis, callback=callback, | |
| postsolve_args=postsolve_args, | |
| maxiter=maxiter, tol=tol, phase=2, | |
| bland=bland, nit0=nit1 | |
| ) | |
| solution = np.zeros(n + m) | |
| solution[basis[:n]] = T[:n, -1] | |
| x = solution[:m] | |
| return x, status, messages[status], int(nit2) | |