| | """Solvers of systems of polynomial equations. """ |
| | import itertools |
| |
|
| | from sympy.core import S |
| | from sympy.core.sorting import default_sort_key |
| | from sympy.polys import Poly, groebner, roots |
| | from sympy.polys.polytools import parallel_poly_from_expr |
| | from sympy.polys.polyerrors import (ComputationFailed, |
| | PolificationFailed, CoercionFailed) |
| | from sympy.simplify import rcollect |
| | from sympy.utilities import postfixes |
| | from sympy.utilities.misc import filldedent |
| |
|
| |
|
| | class SolveFailed(Exception): |
| | """Raised when solver's conditions were not met. """ |
| |
|
| |
|
| | def solve_poly_system(seq, *gens, strict=False, **args): |
| | """ |
| | Return a list of solutions for the system of polynomial equations |
| | or else None. |
| | |
| | Parameters |
| | ========== |
| | |
| | seq: a list/tuple/set |
| | Listing all the equations that are needed to be solved |
| | gens: generators |
| | generators of the equations in seq for which we want the |
| | solutions |
| | strict: a boolean (default is False) |
| | if strict is True, NotImplementedError will be raised if |
| | the solution is known to be incomplete (which can occur if |
| | not all solutions are expressible in radicals) |
| | args: Keyword arguments |
| | Special options for solving the equations. |
| | |
| | |
| | Returns |
| | ======= |
| | |
| | List[Tuple] |
| | a list of tuples with elements being solutions for the |
| | symbols in the order they were passed as gens |
| | None |
| | None is returned when the computed basis contains only the ground. |
| | |
| | Examples |
| | ======== |
| | |
| | >>> from sympy import solve_poly_system |
| | >>> from sympy.abc import x, y |
| | |
| | >>> solve_poly_system([x*y - 2*y, 2*y**2 - x**2], x, y) |
| | [(0, 0), (2, -sqrt(2)), (2, sqrt(2))] |
| | |
| | >>> solve_poly_system([x**5 - x + y**3, y**2 - 1], x, y, strict=True) |
| | Traceback (most recent call last): |
| | ... |
| | UnsolvableFactorError |
| | |
| | """ |
| | try: |
| | polys, opt = parallel_poly_from_expr(seq, *gens, **args) |
| | except PolificationFailed as exc: |
| | raise ComputationFailed('solve_poly_system', len(seq), exc) |
| |
|
| | if len(polys) == len(opt.gens) == 2: |
| | f, g = polys |
| |
|
| | if all(i <= 2 for i in f.degree_list() + g.degree_list()): |
| | try: |
| | return solve_biquadratic(f, g, opt) |
| | except SolveFailed: |
| | pass |
| |
|
| | return solve_generic(polys, opt, strict=strict) |
| |
|
| |
|
| | def solve_biquadratic(f, g, opt): |
| | """Solve a system of two bivariate quadratic polynomial equations. |
| | |
| | Parameters |
| | ========== |
| | |
| | f: a single Expr or Poly |
| | First equation |
| | g: a single Expr or Poly |
| | Second Equation |
| | opt: an Options object |
| | For specifying keyword arguments and generators |
| | |
| | Returns |
| | ======= |
| | |
| | List[Tuple] |
| | a list of tuples with elements being solutions for the |
| | symbols in the order they were passed as gens |
| | None |
| | None is returned when the computed basis contains only the ground. |
| | |
| | Examples |
| | ======== |
| | |
| | >>> from sympy import Options, Poly |
| | >>> from sympy.abc import x, y |
| | >>> from sympy.solvers.polysys import solve_biquadratic |
| | >>> NewOption = Options((x, y), {'domain': 'ZZ'}) |
| | |
| | >>> a = Poly(y**2 - 4 + x, y, x, domain='ZZ') |
| | >>> b = Poly(y*2 + 3*x - 7, y, x, domain='ZZ') |
| | >>> solve_biquadratic(a, b, NewOption) |
| | [(1/3, 3), (41/27, 11/9)] |
| | |
| | >>> a = Poly(y + x**2 - 3, y, x, domain='ZZ') |
| | >>> b = Poly(-y + x - 4, y, x, domain='ZZ') |
| | >>> solve_biquadratic(a, b, NewOption) |
| | [(7/2 - sqrt(29)/2, -sqrt(29)/2 - 1/2), (sqrt(29)/2 + 7/2, -1/2 + \ |
| | sqrt(29)/2)] |
| | """ |
| | G = groebner([f, g]) |
| |
|
| | if len(G) == 1 and G[0].is_ground: |
| | return None |
| |
|
| | if len(G) != 2: |
| | raise SolveFailed |
| |
|
| | x, y = opt.gens |
| | p, q = G |
| | if not p.gcd(q).is_ground: |
| | |
| | raise SolveFailed |
| |
|
| | p = Poly(p, x, expand=False) |
| | p_roots = [rcollect(expr, y) for expr in roots(p).keys()] |
| |
|
| | q = q.ltrim(-1) |
| | q_roots = list(roots(q).keys()) |
| |
|
| | solutions = [(p_root.subs(y, q_root), q_root) for q_root, p_root in |
| | itertools.product(q_roots, p_roots)] |
| |
|
| | return sorted(solutions, key=default_sort_key) |
| |
|
| |
|
| | def solve_generic(polys, opt, strict=False): |
| | """ |
| | Solve a generic system of polynomial equations. |
| | |
| | Returns all possible solutions over C[x_1, x_2, ..., x_m] of a |
| | set F = { f_1, f_2, ..., f_n } of polynomial equations, using |
| | Groebner basis approach. For now only zero-dimensional systems |
| | are supported, which means F can have at most a finite number |
| | of solutions. If the basis contains only the ground, None is |
| | returned. |
| | |
| | The algorithm works by the fact that, supposing G is the basis |
| | of F with respect to an elimination order (here lexicographic |
| | order is used), G and F generate the same ideal, they have the |
| | same set of solutions. By the elimination property, if G is a |
| | reduced, zero-dimensional Groebner basis, then there exists an |
| | univariate polynomial in G (in its last variable). This can be |
| | solved by computing its roots. Substituting all computed roots |
| | for the last (eliminated) variable in other elements of G, new |
| | polynomial system is generated. Applying the above procedure |
| | recursively, a finite number of solutions can be found. |
| | |
| | The ability of finding all solutions by this procedure depends |
| | on the root finding algorithms. If no solutions were found, it |
| | means only that roots() failed, but the system is solvable. To |
| | overcome this difficulty use numerical algorithms instead. |
| | |
| | Parameters |
| | ========== |
| | |
| | polys: a list/tuple/set |
| | Listing all the polynomial equations that are needed to be solved |
| | opt: an Options object |
| | For specifying keyword arguments and generators |
| | strict: a boolean |
| | If strict is True, NotImplementedError will be raised if the solution |
| | is known to be incomplete |
| | |
| | Returns |
| | ======= |
| | |
| | List[Tuple] |
| | a list of tuples with elements being solutions for the |
| | symbols in the order they were passed as gens |
| | None |
| | None is returned when the computed basis contains only the ground. |
| | |
| | References |
| | ========== |
| | |
| | .. [Buchberger01] B. Buchberger, Groebner Bases: A Short |
| | Introduction for Systems Theorists, In: R. Moreno-Diaz, |
| | B. Buchberger, J.L. Freire, Proceedings of EUROCAST'01, |
| | February, 2001 |
| | |
| | .. [Cox97] D. Cox, J. Little, D. O'Shea, Ideals, Varieties |
| | and Algorithms, Springer, Second Edition, 1997, pp. 112 |
| | |
| | Raises |
| | ======== |
| | |
| | NotImplementedError |
| | If the system is not zero-dimensional (does not have a finite |
| | number of solutions) |
| | |
| | UnsolvableFactorError |
| | If ``strict`` is True and not all solution components are |
| | expressible in radicals |
| | |
| | Examples |
| | ======== |
| | |
| | >>> from sympy import Poly, Options |
| | >>> from sympy.solvers.polysys import solve_generic |
| | >>> from sympy.abc import x, y |
| | >>> NewOption = Options((x, y), {'domain': 'ZZ'}) |
| | |
| | >>> a = Poly(x - y + 5, x, y, domain='ZZ') |
| | >>> b = Poly(x + y - 3, x, y, domain='ZZ') |
| | >>> solve_generic([a, b], NewOption) |
| | [(-1, 4)] |
| | |
| | >>> a = Poly(x - 2*y + 5, x, y, domain='ZZ') |
| | >>> b = Poly(2*x - y - 3, x, y, domain='ZZ') |
| | >>> solve_generic([a, b], NewOption) |
| | [(11/3, 13/3)] |
| | |
| | >>> a = Poly(x**2 + y, x, y, domain='ZZ') |
| | >>> b = Poly(x + y*4, x, y, domain='ZZ') |
| | >>> solve_generic([a, b], NewOption) |
| | [(0, 0), (1/4, -1/16)] |
| | |
| | >>> a = Poly(x**5 - x + y**3, x, y, domain='ZZ') |
| | >>> b = Poly(y**2 - 1, x, y, domain='ZZ') |
| | >>> solve_generic([a, b], NewOption, strict=True) |
| | Traceback (most recent call last): |
| | ... |
| | UnsolvableFactorError |
| | |
| | """ |
| | def _is_univariate(f): |
| | """Returns True if 'f' is univariate in its last variable. """ |
| | for monom in f.monoms(): |
| | if any(monom[:-1]): |
| | return False |
| |
|
| | return True |
| |
|
| | def _subs_root(f, gen, zero): |
| | """Replace generator with a root so that the result is nice. """ |
| | p = f.as_expr({gen: zero}) |
| |
|
| | if f.degree(gen) >= 2: |
| | p = p.expand(deep=False) |
| |
|
| | return p |
| |
|
| | def _solve_reduced_system(system, gens, entry=False): |
| | """Recursively solves reduced polynomial systems. """ |
| | if len(system) == len(gens) == 1: |
| | |
| | |
| | zeros = list(roots(system[0], gens[-1], strict=strict).keys()) |
| | return [(zero,) for zero in zeros] |
| |
|
| | basis = groebner(system, gens, polys=True) |
| |
|
| | if len(basis) == 1 and basis[0].is_ground: |
| | if not entry: |
| | return [] |
| | else: |
| | return None |
| |
|
| | univariate = list(filter(_is_univariate, basis)) |
| |
|
| | if len(basis) < len(gens): |
| | raise NotImplementedError(filldedent(''' |
| | only zero-dimensional systems supported |
| | (finite number of solutions) |
| | ''')) |
| |
|
| | if len(univariate) == 1: |
| | f = univariate.pop() |
| | else: |
| | raise NotImplementedError(filldedent(''' |
| | only zero-dimensional systems supported |
| | (finite number of solutions) |
| | ''')) |
| |
|
| | gens = f.gens |
| | gen = gens[-1] |
| |
|
| | |
| | |
| | zeros = list(roots(f.ltrim(gen), strict=strict).keys()) |
| |
|
| | if not zeros: |
| | return [] |
| |
|
| | if len(basis) == 1: |
| | return [(zero,) for zero in zeros] |
| |
|
| | solutions = [] |
| |
|
| | for zero in zeros: |
| | new_system = [] |
| | new_gens = gens[:-1] |
| |
|
| | for b in basis[:-1]: |
| | eq = _subs_root(b, gen, zero) |
| |
|
| | if eq is not S.Zero: |
| | new_system.append(eq) |
| |
|
| | for solution in _solve_reduced_system(new_system, new_gens): |
| | solutions.append(solution + (zero,)) |
| |
|
| | if solutions and len(solutions[0]) != len(gens): |
| | raise NotImplementedError(filldedent(''' |
| | only zero-dimensional systems supported |
| | (finite number of solutions) |
| | ''')) |
| | return solutions |
| |
|
| | try: |
| | result = _solve_reduced_system(polys, opt.gens, entry=True) |
| | except CoercionFailed: |
| | raise NotImplementedError |
| |
|
| | if result is not None: |
| | return sorted(result, key=default_sort_key) |
| |
|
| |
|
| | def solve_triangulated(polys, *gens, **args): |
| | """ |
| | Solve a polynomial system using Gianni-Kalkbrenner algorithm. |
| | |
| | The algorithm proceeds by computing one Groebner basis in the ground |
| | domain and then by iteratively computing polynomial factorizations in |
| | appropriately constructed algebraic extensions of the ground domain. |
| | |
| | Parameters |
| | ========== |
| | |
| | polys: a list/tuple/set |
| | Listing all the equations that are needed to be solved |
| | gens: generators |
| | generators of the equations in polys for which we want the |
| | solutions |
| | args: Keyword arguments |
| | Special options for solving the equations |
| | |
| | Returns |
| | ======= |
| | |
| | List[Tuple] |
| | A List of tuples. Solutions for symbols that satisfy the |
| | equations listed in polys |
| | |
| | Examples |
| | ======== |
| | |
| | >>> from sympy import solve_triangulated |
| | >>> from sympy.abc import x, y, z |
| | |
| | >>> F = [x**2 + y + z - 1, x + y**2 + z - 1, x + y + z**2 - 1] |
| | |
| | >>> solve_triangulated(F, x, y, z) |
| | [(0, 0, 1), (0, 1, 0), (1, 0, 0)] |
| | |
| | References |
| | ========== |
| | |
| | 1. Patrizia Gianni, Teo Mora, Algebraic Solution of System of |
| | Polynomial Equations using Groebner Bases, AAECC-5 on Applied Algebra, |
| | Algebraic Algorithms and Error-Correcting Codes, LNCS 356 247--257, 1989 |
| | |
| | """ |
| | G = groebner(polys, gens, polys=True) |
| | G = list(reversed(G)) |
| |
|
| | domain = args.get('domain') |
| |
|
| | if domain is not None: |
| | for i, g in enumerate(G): |
| | G[i] = g.set_domain(domain) |
| |
|
| | f, G = G[0].ltrim(-1), G[1:] |
| | dom = f.get_domain() |
| |
|
| | zeros = f.ground_roots() |
| | solutions = {((zero,), dom) for zero in zeros} |
| |
|
| | var_seq = reversed(gens[:-1]) |
| | vars_seq = postfixes(gens[1:]) |
| |
|
| | for var, vars in zip(var_seq, vars_seq): |
| | _solutions = set() |
| |
|
| | for values, dom in solutions: |
| | H, mapping = [], list(zip(vars, values)) |
| |
|
| | for g in G: |
| | _vars = (var,) + vars |
| |
|
| | if g.has_only_gens(*_vars) and g.degree(var) != 0: |
| | h = g.ltrim(var).eval(dict(mapping)) |
| |
|
| | if g.degree(var) == h.degree(): |
| | H.append(h) |
| |
|
| | p = min(H, key=lambda h: h.degree()) |
| | zeros = p.ground_roots() |
| |
|
| | for zero in zeros: |
| | if not zero.is_Rational: |
| | dom_zero = dom.algebraic_field(zero) |
| | else: |
| | dom_zero = dom |
| |
|
| | _solutions.add(((zero,) + values, dom_zero)) |
| |
|
| | solutions = _solutions |
| |
|
| | solutions = list(solutions) |
| |
|
| | for i, (solution, _) in enumerate(solutions): |
| | solutions[i] = solution |
| |
|
| | return sorted(solutions, key=default_sort_key) |
| |
|
