"""Low-level linear systems solver. """ from sympy.utilities.exceptions import sympy_deprecation_warning from sympy.utilities.iterables import connected_components from sympy.core.sympify import sympify from sympy.core.numbers import Integer, Rational from sympy.matrices.dense import MutableDenseMatrix from sympy.polys.domains import ZZ, QQ from sympy.polys.domains import EX from sympy.polys.rings import sring from sympy.polys.polyerrors import NotInvertible from sympy.polys.domainmatrix import DomainMatrix class PolyNonlinearError(Exception): """Raised by solve_lin_sys for nonlinear equations""" pass class RawMatrix(MutableDenseMatrix): """ .. deprecated:: 1.9 This class fundamentally is broken by design. Use ``DomainMatrix`` if you want a matrix over the polys domains or ``Matrix`` for a matrix with ``Expr`` elements. The ``RawMatrix`` class will be removed/broken in future in order to reestablish the invariant that the elements of a Matrix should be of type ``Expr``. """ _sympify = staticmethod(lambda x: x) # type: ignore def __init__(self, *args, **kwargs): sympy_deprecation_warning( """ The RawMatrix class is deprecated. Use either DomainMatrix or Matrix instead. """, deprecated_since_version="1.9", active_deprecations_target="deprecated-rawmatrix", ) domain = ZZ for i in range(self.rows): for j in range(self.cols): val = self[i,j] if getattr(val, 'is_Poly', False): K = val.domain[val.gens] val_sympy = val.as_expr() elif hasattr(val, 'parent'): K = val.parent() val_sympy = K.to_sympy(val) elif isinstance(val, (int, Integer)): K = ZZ val_sympy = sympify(val) elif isinstance(val, Rational): K = QQ val_sympy = val else: for K in ZZ, QQ: if K.of_type(val): val_sympy = K.to_sympy(val) break else: raise TypeError domain = domain.unify(K) self[i,j] = val_sympy self.ring = domain def eqs_to_matrix(eqs_coeffs, eqs_rhs, gens, domain): """Get matrix from linear equations in dict format. Explanation =========== Get the matrix representation of a system of linear equations represented as dicts with low-level DomainElement coefficients. This is an *internal* function that is used by solve_lin_sys. Parameters ========== eqs_coeffs: list[dict[Symbol, DomainElement]] The left hand sides of the equations as dicts mapping from symbols to coefficients where the coefficients are instances of DomainElement. eqs_rhs: list[DomainElements] The right hand sides of the equations as instances of DomainElement. gens: list[Symbol] The unknowns in the system of equations. domain: Domain The domain for coefficients of both lhs and rhs. Returns ======= The augmented matrix representation of the system as a DomainMatrix. Examples ======== >>> from sympy import symbols, ZZ >>> from sympy.polys.solvers import eqs_to_matrix >>> x, y = symbols('x, y') >>> eqs_coeff = [{x:ZZ(1), y:ZZ(1)}, {x:ZZ(1), y:ZZ(-1)}] >>> eqs_rhs = [ZZ(0), ZZ(-1)] >>> eqs_to_matrix(eqs_coeff, eqs_rhs, [x, y], ZZ) DomainMatrix([[1, 1, 0], [1, -1, 1]], (2, 3), ZZ) See also ======== solve_lin_sys: Uses :func:`~eqs_to_matrix` internally """ sym2index = {x: n for n, x in enumerate(gens)} nrows = len(eqs_coeffs) ncols = len(gens) + 1 rows = [[domain.zero] * ncols for _ in range(nrows)] for row, eq_coeff, eq_rhs in zip(rows, eqs_coeffs, eqs_rhs): for sym, coeff in eq_coeff.items(): row[sym2index[sym]] = domain.convert(coeff) row[-1] = -domain.convert(eq_rhs) return DomainMatrix(rows, (nrows, ncols), domain) def sympy_eqs_to_ring(eqs, symbols): """Convert a system of equations from Expr to a PolyRing Explanation =========== High-level functions like ``solve`` expect Expr as inputs but can use ``solve_lin_sys`` internally. This function converts equations from ``Expr`` to the low-level poly types used by the ``solve_lin_sys`` function. Parameters ========== eqs: List of Expr A list of equations as Expr instances symbols: List of Symbol A list of the symbols that are the unknowns in the system of equations. Returns ======= Tuple[List[PolyElement], Ring]: The equations as PolyElement instances and the ring of polynomials within which each equation is represented. Examples ======== >>> from sympy import symbols >>> from sympy.polys.solvers import sympy_eqs_to_ring >>> a, x, y = symbols('a, x, y') >>> eqs = [x-y, x+a*y] >>> eqs_ring, ring = sympy_eqs_to_ring(eqs, [x, y]) >>> eqs_ring [x - y, x + a*y] >>> type(eqs_ring[0]) >>> ring ZZ(a)[x,y] With the equations in this form they can be passed to ``solve_lin_sys``: >>> from sympy.polys.solvers import solve_lin_sys >>> solve_lin_sys(eqs_ring, ring) {y: 0, x: 0} """ try: K, eqs_K = sring(eqs, symbols, field=True, extension=True) except NotInvertible: # https://github.com/sympy/sympy/issues/18874 K, eqs_K = sring(eqs, symbols, domain=EX) return eqs_K, K.to_domain() def solve_lin_sys(eqs, ring, _raw=True): """Solve a system of linear equations from a PolynomialRing Explanation =========== Solves a system of linear equations given as PolyElement instances of a PolynomialRing. The basic arithmetic is carried out using instance of DomainElement which is more efficient than :class:`~sympy.core.expr.Expr` for the most common inputs. While this is a public function it is intended primarily for internal use so its interface is not necessarily convenient. Users are suggested to use the :func:`sympy.solvers.solveset.linsolve` function (which uses this function internally) instead. Parameters ========== eqs: list[PolyElement] The linear equations to be solved as elements of a PolynomialRing (assumed equal to zero). ring: PolynomialRing The polynomial ring from which eqs are drawn. The generators of this ring are the unknowns to be solved for and the domain of the ring is the domain of the coefficients of the system of equations. _raw: bool If *_raw* is False, the keys and values in the returned dictionary will be of type Expr (and the unit of the field will be removed from the keys) otherwise the low-level polys types will be returned, e.g. PolyElement: PythonRational. Returns ======= ``None`` if the system has no solution. dict[Symbol, Expr] if _raw=False dict[Symbol, DomainElement] if _raw=True. Examples ======== >>> from sympy import symbols >>> from sympy.polys.solvers import solve_lin_sys, sympy_eqs_to_ring >>> x, y = symbols('x, y') >>> eqs = [x - y, x + y - 2] >>> eqs_ring, ring = sympy_eqs_to_ring(eqs, [x, y]) >>> solve_lin_sys(eqs_ring, ring) {y: 1, x: 1} Passing ``_raw=False`` returns the same result except that the keys are ``Expr`` rather than low-level poly types. >>> solve_lin_sys(eqs_ring, ring, _raw=False) {x: 1, y: 1} See also ======== sympy_eqs_to_ring: prepares the inputs to ``solve_lin_sys``. linsolve: ``linsolve`` uses ``solve_lin_sys`` internally. sympy.solvers.solvers.solve: ``solve`` uses ``solve_lin_sys`` internally. """ as_expr = not _raw assert ring.domain.is_Field eqs_dict = [dict(eq) for eq in eqs] one_monom = ring.one.monoms()[0] zero = ring.domain.zero eqs_rhs = [] eqs_coeffs = [] for eq_dict in eqs_dict: eq_rhs = eq_dict.pop(one_monom, zero) eq_coeffs = {} for monom, coeff in eq_dict.items(): if sum(monom) != 1: msg = "Nonlinear term encountered in solve_lin_sys" raise PolyNonlinearError(msg) eq_coeffs[ring.gens[monom.index(1)]] = coeff if not eq_coeffs: if not eq_rhs: continue else: return None eqs_rhs.append(eq_rhs) eqs_coeffs.append(eq_coeffs) result = _solve_lin_sys(eqs_coeffs, eqs_rhs, ring) if result is not None and as_expr: def to_sympy(x): as_expr = getattr(x, 'as_expr', None) if as_expr: return as_expr() else: return ring.domain.to_sympy(x) tresult = {to_sympy(sym): to_sympy(val) for sym, val in result.items()} # Remove 1.0x result = {} for k, v in tresult.items(): if k.is_Mul: c, s = k.as_coeff_Mul() result[s] = v/c else: result[k] = v return result def _solve_lin_sys(eqs_coeffs, eqs_rhs, ring): """Solve a linear system from dict of PolynomialRing coefficients Explanation =========== This is an **internal** function used by :func:`solve_lin_sys` after the equations have been preprocessed. The role of this function is to split the system into connected components and pass those to :func:`_solve_lin_sys_component`. Examples ======== Setup a system for $x-y=0$ and $x+y=2$ and solve: >>> from sympy import symbols, sring >>> from sympy.polys.solvers import _solve_lin_sys >>> x, y = symbols('x, y') >>> R, (xr, yr) = sring([x, y], [x, y]) >>> eqs = [{xr:R.one, yr:-R.one}, {xr:R.one, yr:R.one}] >>> eqs_rhs = [R.zero, -2*R.one] >>> _solve_lin_sys(eqs, eqs_rhs, R) {y: 1, x: 1} See also ======== solve_lin_sys: This function is used internally by :func:`solve_lin_sys`. """ V = ring.gens E = [] for eq_coeffs in eqs_coeffs: syms = list(eq_coeffs) E.extend(zip(syms[:-1], syms[1:])) G = V, E components = connected_components(G) sym2comp = {} for n, component in enumerate(components): for sym in component: sym2comp[sym] = n subsystems = [([], []) for _ in range(len(components))] for eq_coeff, eq_rhs in zip(eqs_coeffs, eqs_rhs): sym = next(iter(eq_coeff), None) sub_coeff, sub_rhs = subsystems[sym2comp[sym]] sub_coeff.append(eq_coeff) sub_rhs.append(eq_rhs) sol = {} for subsystem in subsystems: subsol = _solve_lin_sys_component(subsystem[0], subsystem[1], ring) if subsol is None: return None sol.update(subsol) return sol def _solve_lin_sys_component(eqs_coeffs, eqs_rhs, ring): """Solve a linear system from dict of PolynomialRing coefficients Explanation =========== This is an **internal** function used by :func:`solve_lin_sys` after the equations have been preprocessed. After :func:`_solve_lin_sys` splits the system into connected components this function is called for each component. The system of equations is solved using Gauss-Jordan elimination with division followed by back-substitution. Examples ======== Setup a system for $x-y=0$ and $x+y=2$ and solve: >>> from sympy import symbols, sring >>> from sympy.polys.solvers import _solve_lin_sys_component >>> x, y = symbols('x, y') >>> R, (xr, yr) = sring([x, y], [x, y]) >>> eqs = [{xr:R.one, yr:-R.one}, {xr:R.one, yr:R.one}] >>> eqs_rhs = [R.zero, -2*R.one] >>> _solve_lin_sys_component(eqs, eqs_rhs, R) {y: 1, x: 1} See also ======== solve_lin_sys: This function is used internally by :func:`solve_lin_sys`. """ # transform from equations to matrix form matrix = eqs_to_matrix(eqs_coeffs, eqs_rhs, ring.gens, ring.domain) # convert to a field for rref if not matrix.domain.is_Field: matrix = matrix.to_field() # solve by row-reduction echelon, pivots = matrix.rref() # construct the returnable form of the solutions keys = ring.gens if pivots and pivots[-1] == len(keys): return None if len(pivots) == len(keys): sol = [] for s in [row[-1] for row in echelon.rep.to_ddm()]: a = s sol.append(a) sols = dict(zip(keys, sol)) else: sols = {} g = ring.gens # Extract ground domain coefficients and convert to the ring: if hasattr(ring, 'ring'): convert = ring.ring.ground_new else: convert = ring.ground_new echelon = echelon.rep.to_ddm() vals_set = {v for row in echelon for v in row} vals_map = {v: convert(v) for v in vals_set} echelon = [[vals_map[eij] for eij in ei] for ei in echelon] for i, p in enumerate(pivots): v = echelon[i][-1] - sum(echelon[i][j]*g[j] for j in range(p+1, len(g)) if echelon[i][j]) sols[keys[p]] = v return sols