image-handler/image-handler10.0/venv/lib/site-packages/sympy/polys/polyfuncs.py

"""High-level polynomials manipulation functions. """


from sympy.core import S, Basic, symbols, Dummy
from sympy.polys.polyerrors import (
    PolificationFailed, ComputationFailed,
    MultivariatePolynomialError, OptionError)
from sympy.polys.polyoptions import allowed_flags, build_options
from sympy.polys.polytools import poly_from_expr, Poly
from sympy.polys.specialpolys import (
    symmetric_poly, interpolating_poly)
from sympy.polys.rings import sring
from sympy.utilities import numbered_symbols, take, public

@public
def symmetrize(F, *gens, **args):
    r"""
    Rewrite a polynomial in terms of elementary symmetric polynomials.

    A symmetric polynomial is a multivariate polynomial that remains invariant
    under any variable permutation, i.e., if `f = f(x_1, x_2, \dots, x_n)`,
    then `f = f(x_{i_1}, x_{i_2}, \dots, x_{i_n})`, where
    `(i_1, i_2, \dots, i_n)` is a permutation of `(1, 2, \dots, n)` (an
    element of the group `S_n`).

    Returns a tuple of symmetric polynomials ``(f1, f2, ..., fn)`` such that
    ``f = f1 + f2 + ... + fn``.

    Examples
    ========

    >>> from sympy.polys.polyfuncs import symmetrize
    >>> from sympy.abc import x, y

    >>> symmetrize(x**2 + y**2)
    (-2*x*y + (x + y)**2, 0)

    >>> symmetrize(x**2 + y**2, formal=True)
    (s1**2 - 2*s2, 0, [(s1, x + y), (s2, x*y)])

    >>> symmetrize(x**2 - y**2)
    (-2*x*y + (x + y)**2, -2*y**2)

    >>> symmetrize(x**2 - y**2, formal=True)
    (s1**2 - 2*s2, -2*y**2, [(s1, x + y), (s2, x*y)])

    """
    allowed_flags(args, ['formal', 'symbols'])

    iterable = True

    if not hasattr(F, '__iter__'):
        iterable = False
        F = [F]

    R, F = sring(F, *gens, **args)
    gens = R.symbols

    opt = build_options(gens, args)
    symbols = opt.symbols
    symbols = [next(symbols) for i in range(len(gens))]

    result = []

    for f in F:
        p, r, m = f.symmetrize()
        result.append((p.as_expr(*symbols), r.as_expr(*gens)))

    polys = [(s, g.as_expr()) for s, (_, g) in zip(symbols, m)]

    if not opt.formal:
        for i, (sym, non_sym) in enumerate(result):
            result[i] = (sym.subs(polys), non_sym)

    if not iterable:
        result, = result

    if not opt.formal:
        return result
    else:
        if iterable:
            return result, polys
        else:
            return result + (polys,)


@public
def horner(f, *gens, **args):
    """
    Rewrite a polynomial in Horner form.

    Among other applications, evaluation of a polynomial at a point is optimal
    when it is applied using the Horner scheme ([1]).

    Examples
    ========

    >>> from sympy.polys.polyfuncs import horner
    >>> from sympy.abc import x, y, a, b, c, d, e

    >>> horner(9*x**4 + 8*x**3 + 7*x**2 + 6*x + 5)
    x*(x*(x*(9*x + 8) + 7) + 6) + 5

    >>> horner(a*x**4 + b*x**3 + c*x**2 + d*x + e)
    e + x*(d + x*(c + x*(a*x + b)))

    >>> f = 4*x**2*y**2 + 2*x**2*y + 2*x*y**2 + x*y

    >>> horner(f, wrt=x)
    x*(x*y*(4*y + 2) + y*(2*y + 1))

    >>> horner(f, wrt=y)
    y*(x*y*(4*x + 2) + x*(2*x + 1))

    References
    ==========
    [1] - https://en.wikipedia.org/wiki/Horner_scheme

    """
    allowed_flags(args, [])

    try:
        F, opt = poly_from_expr(f, *gens, **args)
    except PolificationFailed as exc:
        return exc.expr

    form, gen = S.Zero, F.gen

    if F.is_univariate:
        for coeff in F.all_coeffs():
            form = form*gen + coeff
    else:
        F, gens = Poly(F, gen), gens[1:]

        for coeff in F.all_coeffs():
            form = form*gen + horner(coeff, *gens, **args)

    return form


@public
def interpolate(data, x):
    """
    Construct an interpolating polynomial for the data points
    evaluated at point x (which can be symbolic or numeric).

    Examples
    ========

    >>> from sympy.polys.polyfuncs import interpolate
    >>> from sympy.abc import a, b, x

    A list is interpreted as though it were paired with a range starting
    from 1:

    >>> interpolate([1, 4, 9, 16], x)
    x**2

    This can be made explicit by giving a list of coordinates:

    >>> interpolate([(1, 1), (2, 4), (3, 9)], x)
    x**2

    The (x, y) coordinates can also be given as keys and values of a
    dictionary (and the points need not be equispaced):

    >>> interpolate([(-1, 2), (1, 2), (2, 5)], x)
    x**2 + 1
    >>> interpolate({-1: 2, 1: 2, 2: 5}, x)
    x**2 + 1

    If the interpolation is going to be used only once then the
    value of interest can be passed instead of passing a symbol:

    >>> interpolate([1, 4, 9], 5)
    25

    Symbolic coordinates are also supported:

    >>> [(i,interpolate((a, b), i)) for i in range(1, 4)]
    [(1, a), (2, b), (3, -a + 2*b)]
    """
    n = len(data)

    if isinstance(data, dict):
        if x in data:
            return S(data[x])
        X, Y = list(zip(*data.items()))
    else:
        if isinstance(data[0], tuple):
            X, Y = list(zip(*data))
            if x in X:
                return S(Y[X.index(x)])
        else:
            if x in range(1, n + 1):
                return S(data[x - 1])
            Y = list(data)
            X = list(range(1, n + 1))

    try:
        return interpolating_poly(n, x, X, Y).expand()
    except ValueError:
        d = Dummy()
        return interpolating_poly(n, d, X, Y).expand().subs(d, x)


@public
def rational_interpolate(data, degnum, X=symbols('x')):
    """
    Returns a rational interpolation, where the data points are element of
    any integral domain.

    The first argument  contains the data (as a list of coordinates). The
    ``degnum`` argument is the degree in the numerator of the rational
    function. Setting it too high will decrease the maximal degree in the
    denominator for the same amount of data.

    Examples
    ========

    >>> from sympy.polys.polyfuncs import rational_interpolate

    >>> data = [(1, -210), (2, -35), (3, 105), (4, 231), (5, 350), (6, 465)]
    >>> rational_interpolate(data, 2)
    (105*x**2 - 525)/(x + 1)

    Values do not need to be integers:

    >>> from sympy import sympify
    >>> x = [1, 2, 3, 4, 5, 6]
    >>> y = sympify("[-1, 0, 2, 22/5, 7, 68/7]")
    >>> rational_interpolate(zip(x, y), 2)
    (3*x**2 - 7*x + 2)/(x + 1)

    The symbol for the variable can be changed if needed:
    >>> from sympy import symbols
    >>> z = symbols('z')
    >>> rational_interpolate(data, 2, X=z)
    (105*z**2 - 525)/(z + 1)

    References
    ==========

    .. [1] Algorithm is adapted from:
           http://axiom-wiki.newsynthesis.org/RationalInterpolation

    """
    from sympy.matrices.dense import ones

    xdata, ydata = list(zip(*data))

    k = len(xdata) - degnum - 1
    if k < 0:
        raise OptionError("Too few values for the required degree.")
    c = ones(degnum + k + 1, degnum + k + 2)
    for j in range(max(degnum, k)):
        for i in range(degnum + k + 1):
            c[i, j + 1] = c[i, j]*xdata[i]
    for j in range(k + 1):
        for i in range(degnum + k + 1):
            c[i, degnum + k + 1 - j] = -c[i, k - j]*ydata[i]
    r = c.nullspace()[0]
    return (sum(r[i] * X**i for i in range(degnum + 1))
            / sum(r[i + degnum + 1] * X**i for i in range(k + 1)))


@public
def viete(f, roots=None, *gens, **args):
    """
    Generate Viete's formulas for ``f``.

    Examples
    ========

    >>> from sympy.polys.polyfuncs import viete
    >>> from sympy import symbols

    >>> x, a, b, c, r1, r2 = symbols('x,a:c,r1:3')

    >>> viete(a*x**2 + b*x + c, [r1, r2], x)
    [(r1 + r2, -b/a), (r1*r2, c/a)]

    """
    allowed_flags(args, [])

    if isinstance(roots, Basic):
        gens, roots = (roots,) + gens, None

    try:
        f, opt = poly_from_expr(f, *gens, **args)
    except PolificationFailed as exc:
        raise ComputationFailed('viete', 1, exc)

    if f.is_multivariate:
        raise MultivariatePolynomialError(
            "multivariate polynomials are not allowed")

    n = f.degree()

    if n < 1:
        raise ValueError(
            "Cannot derive Viete's formulas for a constant polynomial")

    if roots is None:
        roots = numbered_symbols('r', start=1)

    roots = take(roots, n)

    if n != len(roots):
        raise ValueError("required %s roots, got %s" % (n, len(roots)))

    lc, coeffs = f.LC(), f.all_coeffs()
    result, sign = [], -1

    for i, coeff in enumerate(coeffs[1:]):
        poly = symmetric_poly(i + 1, roots)
        coeff = sign*(coeff/lc)
        result.append((poly, coeff))
        sign = -sign

    return result
first commit 5 months ago			`"""High-level polynomials manipulation functions. """`


			`from sympy.core import S, Basic, symbols, Dummy`
			`from sympy.polys.polyerrors import (`
			`PolificationFailed, ComputationFailed,`
			`MultivariatePolynomialError, OptionError)`
			`from sympy.polys.polyoptions import allowed_flags, build_options`
			`from sympy.polys.polytools import poly_from_expr, Poly`
			`from sympy.polys.specialpolys import (`
			`symmetric_poly, interpolating_poly)`
			`from sympy.polys.rings import sring`
			`from sympy.utilities import numbered_symbols, take, public`

			`@public`
			`def symmetrize(F, gens, *args):`
			`r"""`
			`Rewrite a polynomial in terms of elementary symmetric polynomials.`

			`A symmetric polynomial is a multivariate polynomial that remains invariant`
			under any variable permutation, i.e., if `f = f(x_1, x_2, \dots, x_n)`,
			then `f = f(x_{i_1}, x_{i_2}, \dots, x_{i_n})`, where
			`(i_1, i_2, \dots, i_n)` is a permutation of `(1, 2, \dots, n)` (an
			element of the group `S_n`).

			Returns a tuple of symmetric polynomials ``(f1, f2, ..., fn)`` such that
			``f = f1 + f2 + ... + fn``.

			`Examples`
			`========`

			`>>> from sympy.polys.polyfuncs import symmetrize`
			`>>> from sympy.abc import x, y`

			`>>> symmetrize(x2 + y2)`
			`(-2xy + (x + y)**2, 0)`

			`>>> symmetrize(x2 + y2, formal=True)`
			`(s1*2 - 2s2, 0, [(s1, x + y), (s2, x*y)])`

			`>>> symmetrize(x2 - y2)`
			`(-2xy + (x + y)*2, -2y**2)`

			`>>> symmetrize(x2 - y2, formal=True)`
			`(s1*2 - 2s2, -2y2, [(s1, x + y), (s2, xy)])`

			`"""`
			`allowed_flags(args, ['formal', 'symbols'])`

			`iterable = True`

			`if not hasattr(F, '__iter__'):`
			`iterable = False`
			`F = [F]`

			`R, F = sring(F, gens, *args)`
			`gens = R.symbols`

			`opt = build_options(gens, args)`
			`symbols = opt.symbols`
			`symbols = [next(symbols) for i in range(len(gens))]`

			`result = []`

			`for f in F:`
			`p, r, m = f.symmetrize()`
			`result.append((p.as_expr(symbols), r.as_expr(gens)))`

			`polys = [(s, g.as_expr()) for s, (_, g) in zip(symbols, m)]`

			`if not opt.formal:`
			`for i, (sym, non_sym) in enumerate(result):`
			`result[i] = (sym.subs(polys), non_sym)`

			`if not iterable:`
			`result, = result`

			`if not opt.formal:`
			`return result`
			`else:`
			`if iterable:`
			`return result, polys`
			`else:`
			`return result + (polys,)`


			`@public`
			`def horner(f, gens, *args):`
			`"""`
			`Rewrite a polynomial in Horner form.`

			`Among other applications, evaluation of a polynomial at a point is optimal`
			`when it is applied using the Horner scheme ([1]).`

			`Examples`
			`========`

			`>>> from sympy.polys.polyfuncs import horner`
			`>>> from sympy.abc import x, y, a, b, c, d, e`

			`>>> horner(9x4 + 8x*3 + 7x*2 + 6x + 5)`
			`x(x(x(9x + 8) + 7) + 6) + 5`

			`>>> horner(ax4 + bx*3 + cx*2 + dx + e)`
			`e + x(d + x(c + x(ax + b)))`

			`>>> f = 4x2y*2 + 2x*2y + 2xy*2 + xy`

			`>>> horner(f, wrt=x)`
			`x(xy(4y + 2) + y(2y + 1))`

			`>>> horner(f, wrt=y)`
			`y(xy(4x + 2) + x(2x + 1))`

			`References`
			`==========`
			`[1] - https://en.wikipedia.org/wiki/Horner_scheme`

			`"""`
			`allowed_flags(args, [])`

			`try:`
			`F, opt = poly_from_expr(f, gens, *args)`
			`except PolificationFailed as exc:`
			`return exc.expr`

			`form, gen = S.Zero, F.gen`

			`if F.is_univariate:`
			`for coeff in F.all_coeffs():`
			`form = form*gen + coeff`
			`else:`
			`F, gens = Poly(F, gen), gens[1:]`

			`for coeff in F.all_coeffs():`
			`form = formgen + horner(coeff, gens, **args)`

			`return form`


			`@public`
			`def interpolate(data, x):`
			`"""`
			`Construct an interpolating polynomial for the data points`
			`evaluated at point x (which can be symbolic or numeric).`

			`Examples`
			`========`

			`>>> from sympy.polys.polyfuncs import interpolate`
			`>>> from sympy.abc import a, b, x`

			`A list is interpreted as though it were paired with a range starting`
			`from 1:`

			`>>> interpolate([1, 4, 9, 16], x)`
			`x**2`

			`This can be made explicit by giving a list of coordinates:`

			`>>> interpolate([(1, 1), (2, 4), (3, 9)], x)`
			`x**2`

			`The (x, y) coordinates can also be given as keys and values of a`
			`dictionary (and the points need not be equispaced):`

			`>>> interpolate([(-1, 2), (1, 2), (2, 5)], x)`
			`x**2 + 1`
			`>>> interpolate({-1: 2, 1: 2, 2: 5}, x)`
			`x**2 + 1`

			`If the interpolation is going to be used only once then the`
			`value of interest can be passed instead of passing a symbol:`

			`>>> interpolate([1, 4, 9], 5)`
			`25`

			`Symbolic coordinates are also supported:`

			`>>> [(i,interpolate((a, b), i)) for i in range(1, 4)]`
			`[(1, a), (2, b), (3, -a + 2*b)]`
			`"""`
			`n = len(data)`

			`if isinstance(data, dict):`
			`if x in data:`
			`return S(data[x])`
			`X, Y = list(zip(*data.items()))`
			`else:`
			`if isinstance(data[0], tuple):`
			`X, Y = list(zip(*data))`
			`if x in X:`
			`return S(Y[X.index(x)])`
			`else:`
			`if x in range(1, n + 1):`
			`return S(data[x - 1])`
			`Y = list(data)`
			`X = list(range(1, n + 1))`

			`try:`
			`return interpolating_poly(n, x, X, Y).expand()`
			`except ValueError:`
			`d = Dummy()`
			`return interpolating_poly(n, d, X, Y).expand().subs(d, x)`


			`@public`
			`def rational_interpolate(data, degnum, X=symbols('x')):`
			`"""`
			`Returns a rational interpolation, where the data points are element of`
			`any integral domain.`

			`The first argument contains the data (as a list of coordinates). The`
			``degnum`` argument is the degree in the numerator of the rational
			`function. Setting it too high will decrease the maximal degree in the`
			`denominator for the same amount of data.`

			`Examples`
			`========`

			`>>> from sympy.polys.polyfuncs import rational_interpolate`

			`>>> data = [(1, -210), (2, -35), (3, 105), (4, 231), (5, 350), (6, 465)]`
			`>>> rational_interpolate(data, 2)`
			`(105x*2 - 525)/(x + 1)`

			`Values do not need to be integers:`

			`>>> from sympy import sympify`
			`>>> x = [1, 2, 3, 4, 5, 6]`
			`>>> y = sympify("[-1, 0, 2, 22/5, 7, 68/7]")`
			`>>> rational_interpolate(zip(x, y), 2)`
			`(3x2 - 7x + 2)/(x + 1)`

			`The symbol for the variable can be changed if needed:`
			`>>> from sympy import symbols`
			`>>> z = symbols('z')`
			`>>> rational_interpolate(data, 2, X=z)`
			`(105z*2 - 525)/(z + 1)`

			`References`
			`==========`

			`.. [1] Algorithm is adapted from:`
			`http://axiom-wiki.newsynthesis.org/RationalInterpolation`

			`"""`
			`from sympy.matrices.dense import ones`

			`xdata, ydata = list(zip(*data))`

			`k = len(xdata) - degnum - 1`
			`if k < 0:`
			`raise OptionError("Too few values for the required degree.")`
			`c = ones(degnum + k + 1, degnum + k + 2)`
			`for j in range(max(degnum, k)):`
			`for i in range(degnum + k + 1):`
			`c[i, j + 1] = c[i, j]*xdata[i]`
			`for j in range(k + 1):`
			`for i in range(degnum + k + 1):`
			`c[i, degnum + k + 1 - j] = -c[i, k - j]*ydata[i]`
			`r = c.nullspace()[0]`
			`return (sum(r[i] * X**i for i in range(degnum + 1))`
			`/ sum(r[i + degnum + 1] * X**i for i in range(k + 1)))`


			`@public`
			`def viete(f, roots=None, gens, *args):`
			`"""`
			Generate Viete's formulas for ``f``.

			`Examples`
			`========`

			`>>> from sympy.polys.polyfuncs import viete`
			`>>> from sympy import symbols`

			`>>> x, a, b, c, r1, r2 = symbols('x,a:c,r1:3')`

			`>>> viete(ax2 + bx + c, [r1, r2], x)`
			`[(r1 + r2, -b/a), (r1*r2, c/a)]`

			`"""`
			`allowed_flags(args, [])`

			`if isinstance(roots, Basic):`
			`gens, roots = (roots,) + gens, None`

			`try:`
			`f, opt = poly_from_expr(f, gens, *args)`
			`except PolificationFailed as exc:`
			`raise ComputationFailed('viete', 1, exc)`

			`if f.is_multivariate:`
			`raise MultivariatePolynomialError(`
			`"multivariate polynomials are not allowed")`

			`n = f.degree()`

			`if n < 1:`
			`raise ValueError(`
			`"Cannot derive Viete's formulas for a constant polynomial")`

			`if roots is None:`
			`roots = numbered_symbols('r', start=1)`

			`roots = take(roots, n)`

			`if n != len(roots):`
			`raise ValueError("required %s roots, got %s" % (n, len(roots)))`

			`lc, coeffs = f.LC(), f.all_coeffs()`
			`result, sign = [], -1`

			`for i, coeff in enumerate(coeffs[1:]):`
			`poly = symmetric_poly(i + 1, roots)`
			`coeff = sign*(coeff/lc)`
			`result.append((poly, coeff))`
			`sign = -sign`

			`return result`