| | """ |
| | Utility classes and functions for the polynomial modules. |
| | |
| | This module provides: error and warning objects; a polynomial base class; |
| | and some routines used in both the `polynomial` and `chebyshev` modules. |
| | |
| | Warning objects |
| | --------------- |
| | |
| | .. autosummary:: |
| | :toctree: generated/ |
| | |
| | RankWarning raised in least-squares fit for rank-deficient matrix. |
| | |
| | Functions |
| | --------- |
| | |
| | .. autosummary:: |
| | :toctree: generated/ |
| | |
| | as_series convert list of array_likes into 1-D arrays of common type. |
| | trimseq remove trailing zeros. |
| | trimcoef remove small trailing coefficients. |
| | getdomain return the domain appropriate for a given set of abscissae. |
| | mapdomain maps points between domains. |
| | mapparms parameters of the linear map between domains. |
| | |
| | """ |
| | import operator |
| | import functools |
| | import warnings |
| |
|
| | import numpy as np |
| |
|
| | from numpy.core.multiarray import dragon4_positional, dragon4_scientific |
| | from numpy.core.umath import absolute |
| |
|
| | __all__ = [ |
| | 'RankWarning', 'as_series', 'trimseq', |
| | 'trimcoef', 'getdomain', 'mapdomain', 'mapparms', |
| | 'format_float'] |
| |
|
| | |
| | |
| | |
| |
|
| | class RankWarning(UserWarning): |
| | """Issued by chebfit when the design matrix is rank deficient.""" |
| | pass |
| |
|
| | |
| | |
| | |
| | def trimseq(seq): |
| | """Remove small Poly series coefficients. |
| | |
| | Parameters |
| | ---------- |
| | seq : sequence |
| | Sequence of Poly series coefficients. This routine fails for |
| | empty sequences. |
| | |
| | Returns |
| | ------- |
| | series : sequence |
| | Subsequence with trailing zeros removed. If the resulting sequence |
| | would be empty, return the first element. The returned sequence may |
| | or may not be a view. |
| | |
| | Notes |
| | ----- |
| | Do not lose the type info if the sequence contains unknown objects. |
| | |
| | """ |
| | if len(seq) == 0: |
| | return seq |
| | else: |
| | for i in range(len(seq) - 1, -1, -1): |
| | if seq[i] != 0: |
| | break |
| | return seq[:i+1] |
| |
|
| |
|
| | def as_series(alist, trim=True): |
| | """ |
| | Return argument as a list of 1-d arrays. |
| | |
| | The returned list contains array(s) of dtype double, complex double, or |
| | object. A 1-d argument of shape ``(N,)`` is parsed into ``N`` arrays of |
| | size one; a 2-d argument of shape ``(M,N)`` is parsed into ``M`` arrays |
| | of size ``N`` (i.e., is "parsed by row"); and a higher dimensional array |
| | raises a Value Error if it is not first reshaped into either a 1-d or 2-d |
| | array. |
| | |
| | Parameters |
| | ---------- |
| | alist : array_like |
| | A 1- or 2-d array_like |
| | trim : boolean, optional |
| | When True, trailing zeros are removed from the inputs. |
| | When False, the inputs are passed through intact. |
| | |
| | Returns |
| | ------- |
| | [a1, a2,...] : list of 1-D arrays |
| | A copy of the input data as a list of 1-d arrays. |
| | |
| | Raises |
| | ------ |
| | ValueError |
| | Raised when `as_series` cannot convert its input to 1-d arrays, or at |
| | least one of the resulting arrays is empty. |
| | |
| | Examples |
| | -------- |
| | >>> from numpy.polynomial import polyutils as pu |
| | >>> a = np.arange(4) |
| | >>> pu.as_series(a) |
| | [array([0.]), array([1.]), array([2.]), array([3.])] |
| | >>> b = np.arange(6).reshape((2,3)) |
| | >>> pu.as_series(b) |
| | [array([0., 1., 2.]), array([3., 4., 5.])] |
| | |
| | >>> pu.as_series((1, np.arange(3), np.arange(2, dtype=np.float16))) |
| | [array([1.]), array([0., 1., 2.]), array([0., 1.])] |
| | |
| | >>> pu.as_series([2, [1.1, 0.]]) |
| | [array([2.]), array([1.1])] |
| | |
| | >>> pu.as_series([2, [1.1, 0.]], trim=False) |
| | [array([2.]), array([1.1, 0. ])] |
| | |
| | """ |
| | arrays = [np.array(a, ndmin=1, copy=False) for a in alist] |
| | if min([a.size for a in arrays]) == 0: |
| | raise ValueError("Coefficient array is empty") |
| | if any(a.ndim != 1 for a in arrays): |
| | raise ValueError("Coefficient array is not 1-d") |
| | if trim: |
| | arrays = [trimseq(a) for a in arrays] |
| |
|
| | if any(a.dtype == np.dtype(object) for a in arrays): |
| | ret = [] |
| | for a in arrays: |
| | if a.dtype != np.dtype(object): |
| | tmp = np.empty(len(a), dtype=np.dtype(object)) |
| | tmp[:] = a[:] |
| | ret.append(tmp) |
| | else: |
| | ret.append(a.copy()) |
| | else: |
| | try: |
| | dtype = np.common_type(*arrays) |
| | except Exception as e: |
| | raise ValueError("Coefficient arrays have no common type") from e |
| | ret = [np.array(a, copy=True, dtype=dtype) for a in arrays] |
| | return ret |
| |
|
| |
|
| | def trimcoef(c, tol=0): |
| | """ |
| | Remove "small" "trailing" coefficients from a polynomial. |
| | |
| | "Small" means "small in absolute value" and is controlled by the |
| | parameter `tol`; "trailing" means highest order coefficient(s), e.g., in |
| | ``[0, 1, 1, 0, 0]`` (which represents ``0 + x + x**2 + 0*x**3 + 0*x**4``) |
| | both the 3-rd and 4-th order coefficients would be "trimmed." |
| | |
| | Parameters |
| | ---------- |
| | c : array_like |
| | 1-d array of coefficients, ordered from lowest order to highest. |
| | tol : number, optional |
| | Trailing (i.e., highest order) elements with absolute value less |
| | than or equal to `tol` (default value is zero) are removed. |
| | |
| | Returns |
| | ------- |
| | trimmed : ndarray |
| | 1-d array with trailing zeros removed. If the resulting series |
| | would be empty, a series containing a single zero is returned. |
| | |
| | Raises |
| | ------ |
| | ValueError |
| | If `tol` < 0 |
| | |
| | See Also |
| | -------- |
| | trimseq |
| | |
| | Examples |
| | -------- |
| | >>> from numpy.polynomial import polyutils as pu |
| | >>> pu.trimcoef((0,0,3,0,5,0,0)) |
| | array([0., 0., 3., 0., 5.]) |
| | >>> pu.trimcoef((0,0,1e-3,0,1e-5,0,0),1e-3) # item == tol is trimmed |
| | array([0.]) |
| | >>> i = complex(0,1) # works for complex |
| | >>> pu.trimcoef((3e-4,1e-3*(1-i),5e-4,2e-5*(1+i)), 1e-3) |
| | array([0.0003+0.j , 0.001 -0.001j]) |
| | |
| | """ |
| | if tol < 0: |
| | raise ValueError("tol must be non-negative") |
| |
|
| | [c] = as_series([c]) |
| | [ind] = np.nonzero(np.abs(c) > tol) |
| | if len(ind) == 0: |
| | return c[:1]*0 |
| | else: |
| | return c[:ind[-1] + 1].copy() |
| |
|
| | def getdomain(x): |
| | """ |
| | Return a domain suitable for given abscissae. |
| | |
| | Find a domain suitable for a polynomial or Chebyshev series |
| | defined at the values supplied. |
| | |
| | Parameters |
| | ---------- |
| | x : array_like |
| | 1-d array of abscissae whose domain will be determined. |
| | |
| | Returns |
| | ------- |
| | domain : ndarray |
| | 1-d array containing two values. If the inputs are complex, then |
| | the two returned points are the lower left and upper right corners |
| | of the smallest rectangle (aligned with the axes) in the complex |
| | plane containing the points `x`. If the inputs are real, then the |
| | two points are the ends of the smallest interval containing the |
| | points `x`. |
| | |
| | See Also |
| | -------- |
| | mapparms, mapdomain |
| | |
| | Examples |
| | -------- |
| | >>> from numpy.polynomial import polyutils as pu |
| | >>> points = np.arange(4)**2 - 5; points |
| | array([-5, -4, -1, 4]) |
| | >>> pu.getdomain(points) |
| | array([-5., 4.]) |
| | >>> c = np.exp(complex(0,1)*np.pi*np.arange(12)/6) # unit circle |
| | >>> pu.getdomain(c) |
| | array([-1.-1.j, 1.+1.j]) |
| | |
| | """ |
| | [x] = as_series([x], trim=False) |
| | if x.dtype.char in np.typecodes['Complex']: |
| | rmin, rmax = x.real.min(), x.real.max() |
| | imin, imax = x.imag.min(), x.imag.max() |
| | return np.array((complex(rmin, imin), complex(rmax, imax))) |
| | else: |
| | return np.array((x.min(), x.max())) |
| |
|
| | def mapparms(old, new): |
| | """ |
| | Linear map parameters between domains. |
| | |
| | Return the parameters of the linear map ``offset + scale*x`` that maps |
| | `old` to `new` such that ``old[i] -> new[i]``, ``i = 0, 1``. |
| | |
| | Parameters |
| | ---------- |
| | old, new : array_like |
| | Domains. Each domain must (successfully) convert to a 1-d array |
| | containing precisely two values. |
| | |
| | Returns |
| | ------- |
| | offset, scale : scalars |
| | The map ``L(x) = offset + scale*x`` maps the first domain to the |
| | second. |
| | |
| | See Also |
| | -------- |
| | getdomain, mapdomain |
| | |
| | Notes |
| | ----- |
| | Also works for complex numbers, and thus can be used to calculate the |
| | parameters required to map any line in the complex plane to any other |
| | line therein. |
| | |
| | Examples |
| | -------- |
| | >>> from numpy.polynomial import polyutils as pu |
| | >>> pu.mapparms((-1,1),(-1,1)) |
| | (0.0, 1.0) |
| | >>> pu.mapparms((1,-1),(-1,1)) |
| | (-0.0, -1.0) |
| | >>> i = complex(0,1) |
| | >>> pu.mapparms((-i,-1),(1,i)) |
| | ((1+1j), (1-0j)) |
| | |
| | """ |
| | oldlen = old[1] - old[0] |
| | newlen = new[1] - new[0] |
| | off = (old[1]*new[0] - old[0]*new[1])/oldlen |
| | scl = newlen/oldlen |
| | return off, scl |
| |
|
| | def mapdomain(x, old, new): |
| | """ |
| | Apply linear map to input points. |
| | |
| | The linear map ``offset + scale*x`` that maps the domain `old` to |
| | the domain `new` is applied to the points `x`. |
| | |
| | Parameters |
| | ---------- |
| | x : array_like |
| | Points to be mapped. If `x` is a subtype of ndarray the subtype |
| | will be preserved. |
| | old, new : array_like |
| | The two domains that determine the map. Each must (successfully) |
| | convert to 1-d arrays containing precisely two values. |
| | |
| | Returns |
| | ------- |
| | x_out : ndarray |
| | Array of points of the same shape as `x`, after application of the |
| | linear map between the two domains. |
| | |
| | See Also |
| | -------- |
| | getdomain, mapparms |
| | |
| | Notes |
| | ----- |
| | Effectively, this implements: |
| | |
| | .. math:: |
| | x\\_out = new[0] + m(x - old[0]) |
| | |
| | where |
| | |
| | .. math:: |
| | m = \\frac{new[1]-new[0]}{old[1]-old[0]} |
| | |
| | Examples |
| | -------- |
| | >>> from numpy.polynomial import polyutils as pu |
| | >>> old_domain = (-1,1) |
| | >>> new_domain = (0,2*np.pi) |
| | >>> x = np.linspace(-1,1,6); x |
| | array([-1. , -0.6, -0.2, 0.2, 0.6, 1. ]) |
| | >>> x_out = pu.mapdomain(x, old_domain, new_domain); x_out |
| | array([ 0. , 1.25663706, 2.51327412, 3.76991118, 5.02654825, # may vary |
| | 6.28318531]) |
| | >>> x - pu.mapdomain(x_out, new_domain, old_domain) |
| | array([0., 0., 0., 0., 0., 0.]) |
| | |
| | Also works for complex numbers (and thus can be used to map any line in |
| | the complex plane to any other line therein). |
| | |
| | >>> i = complex(0,1) |
| | >>> old = (-1 - i, 1 + i) |
| | >>> new = (-1 + i, 1 - i) |
| | >>> z = np.linspace(old[0], old[1], 6); z |
| | array([-1. -1.j , -0.6-0.6j, -0.2-0.2j, 0.2+0.2j, 0.6+0.6j, 1. +1.j ]) |
| | >>> new_z = pu.mapdomain(z, old, new); new_z |
| | array([-1.0+1.j , -0.6+0.6j, -0.2+0.2j, 0.2-0.2j, 0.6-0.6j, 1.0-1.j ]) # may vary |
| | |
| | """ |
| | x = np.asanyarray(x) |
| | off, scl = mapparms(old, new) |
| | return off + scl*x |
| |
|
| |
|
| | def _nth_slice(i, ndim): |
| | sl = [np.newaxis] * ndim |
| | sl[i] = slice(None) |
| | return tuple(sl) |
| |
|
| |
|
| | def _vander_nd(vander_fs, points, degrees): |
| | r""" |
| | A generalization of the Vandermonde matrix for N dimensions |
| | |
| | The result is built by combining the results of 1d Vandermonde matrices, |
| | |
| | .. math:: |
| | W[i_0, \ldots, i_M, j_0, \ldots, j_N] = \prod_{k=0}^N{V_k(x_k)[i_0, \ldots, i_M, j_k]} |
| | |
| | where |
| | |
| | .. math:: |
| | N &= \texttt{len(points)} = \texttt{len(degrees)} = \texttt{len(vander\_fs)} \\ |
| | M &= \texttt{points[k].ndim} \\ |
| | V_k &= \texttt{vander\_fs[k]} \\ |
| | x_k &= \texttt{points[k]} \\ |
| | 0 \le j_k &\le \texttt{degrees[k]} |
| | |
| | Expanding the one-dimensional :math:`V_k` functions gives: |
| | |
| | .. math:: |
| | W[i_0, \ldots, i_M, j_0, \ldots, j_N] = \prod_{k=0}^N{B_{k, j_k}(x_k[i_0, \ldots, i_M])} |
| | |
| | where :math:`B_{k,m}` is the m'th basis of the polynomial construction used along |
| | dimension :math:`k`. For a regular polynomial, :math:`B_{k, m}(x) = P_m(x) = x^m`. |
| | |
| | Parameters |
| | ---------- |
| | vander_fs : Sequence[function(array_like, int) -> ndarray] |
| | The 1d vander function to use for each axis, such as ``polyvander`` |
| | points : Sequence[array_like] |
| | Arrays of point coordinates, all of the same shape. The dtypes |
| | will be converted to either float64 or complex128 depending on |
| | whether any of the elements are complex. Scalars are converted to |
| | 1-D arrays. |
| | This must be the same length as `vander_fs`. |
| | degrees : Sequence[int] |
| | The maximum degree (inclusive) to use for each axis. |
| | This must be the same length as `vander_fs`. |
| | |
| | Returns |
| | ------- |
| | vander_nd : ndarray |
| | An array of shape ``points[0].shape + tuple(d + 1 for d in degrees)``. |
| | """ |
| | n_dims = len(vander_fs) |
| | if n_dims != len(points): |
| | raise ValueError( |
| | f"Expected {n_dims} dimensions of sample points, got {len(points)}") |
| | if n_dims != len(degrees): |
| | raise ValueError( |
| | f"Expected {n_dims} dimensions of degrees, got {len(degrees)}") |
| | if n_dims == 0: |
| | raise ValueError("Unable to guess a dtype or shape when no points are given") |
| |
|
| | |
| | points = tuple(np.array(tuple(points), copy=False) + 0.0) |
| |
|
| | |
| | |
| | vander_arrays = ( |
| | vander_fs[i](points[i], degrees[i])[(...,) + _nth_slice(i, n_dims)] |
| | for i in range(n_dims) |
| | ) |
| |
|
| | |
| | return functools.reduce(operator.mul, vander_arrays) |
| |
|
| |
|
| | def _vander_nd_flat(vander_fs, points, degrees): |
| | """ |
| | Like `_vander_nd`, but flattens the last ``len(degrees)`` axes into a single axis |
| | |
| | Used to implement the public ``<type>vander<n>d`` functions. |
| | """ |
| | v = _vander_nd(vander_fs, points, degrees) |
| | return v.reshape(v.shape[:-len(degrees)] + (-1,)) |
| |
|
| |
|
| | def _fromroots(line_f, mul_f, roots): |
| | """ |
| | Helper function used to implement the ``<type>fromroots`` functions. |
| | |
| | Parameters |
| | ---------- |
| | line_f : function(float, float) -> ndarray |
| | The ``<type>line`` function, such as ``polyline`` |
| | mul_f : function(array_like, array_like) -> ndarray |
| | The ``<type>mul`` function, such as ``polymul`` |
| | roots |
| | See the ``<type>fromroots`` functions for more detail |
| | """ |
| | if len(roots) == 0: |
| | return np.ones(1) |
| | else: |
| | [roots] = as_series([roots], trim=False) |
| | roots.sort() |
| | p = [line_f(-r, 1) for r in roots] |
| | n = len(p) |
| | while n > 1: |
| | m, r = divmod(n, 2) |
| | tmp = [mul_f(p[i], p[i+m]) for i in range(m)] |
| | if r: |
| | tmp[0] = mul_f(tmp[0], p[-1]) |
| | p = tmp |
| | n = m |
| | return p[0] |
| |
|
| |
|
| | def _valnd(val_f, c, *args): |
| | """ |
| | Helper function used to implement the ``<type>val<n>d`` functions. |
| | |
| | Parameters |
| | ---------- |
| | val_f : function(array_like, array_like, tensor: bool) -> array_like |
| | The ``<type>val`` function, such as ``polyval`` |
| | c, args |
| | See the ``<type>val<n>d`` functions for more detail |
| | """ |
| | args = [np.asanyarray(a) for a in args] |
| | shape0 = args[0].shape |
| | if not all((a.shape == shape0 for a in args[1:])): |
| | if len(args) == 3: |
| | raise ValueError('x, y, z are incompatible') |
| | elif len(args) == 2: |
| | raise ValueError('x, y are incompatible') |
| | else: |
| | raise ValueError('ordinates are incompatible') |
| | it = iter(args) |
| | x0 = next(it) |
| |
|
| | |
| | c = val_f(x0, c) |
| | for xi in it: |
| | c = val_f(xi, c, tensor=False) |
| | return c |
| |
|
| |
|
| | def _gridnd(val_f, c, *args): |
| | """ |
| | Helper function used to implement the ``<type>grid<n>d`` functions. |
| | |
| | Parameters |
| | ---------- |
| | val_f : function(array_like, array_like, tensor: bool) -> array_like |
| | The ``<type>val`` function, such as ``polyval`` |
| | c, args |
| | See the ``<type>grid<n>d`` functions for more detail |
| | """ |
| | for xi in args: |
| | c = val_f(xi, c) |
| | return c |
| |
|
| |
|
| | def _div(mul_f, c1, c2): |
| | """ |
| | Helper function used to implement the ``<type>div`` functions. |
| | |
| | Implementation uses repeated subtraction of c2 multiplied by the nth basis. |
| | For some polynomial types, a more efficient approach may be possible. |
| | |
| | Parameters |
| | ---------- |
| | mul_f : function(array_like, array_like) -> array_like |
| | The ``<type>mul`` function, such as ``polymul`` |
| | c1, c2 |
| | See the ``<type>div`` functions for more detail |
| | """ |
| | |
| | [c1, c2] = as_series([c1, c2]) |
| | if c2[-1] == 0: |
| | raise ZeroDivisionError() |
| |
|
| | lc1 = len(c1) |
| | lc2 = len(c2) |
| | if lc1 < lc2: |
| | return c1[:1]*0, c1 |
| | elif lc2 == 1: |
| | return c1/c2[-1], c1[:1]*0 |
| | else: |
| | quo = np.empty(lc1 - lc2 + 1, dtype=c1.dtype) |
| | rem = c1 |
| | for i in range(lc1 - lc2, - 1, -1): |
| | p = mul_f([0]*i + [1], c2) |
| | q = rem[-1]/p[-1] |
| | rem = rem[:-1] - q*p[:-1] |
| | quo[i] = q |
| | return quo, trimseq(rem) |
| |
|
| |
|
| | def _add(c1, c2): |
| | """ Helper function used to implement the ``<type>add`` functions. """ |
| | |
| | [c1, c2] = as_series([c1, c2]) |
| | if len(c1) > len(c2): |
| | c1[:c2.size] += c2 |
| | ret = c1 |
| | else: |
| | c2[:c1.size] += c1 |
| | ret = c2 |
| | return trimseq(ret) |
| |
|
| |
|
| | def _sub(c1, c2): |
| | """ Helper function used to implement the ``<type>sub`` functions. """ |
| | |
| | [c1, c2] = as_series([c1, c2]) |
| | if len(c1) > len(c2): |
| | c1[:c2.size] -= c2 |
| | ret = c1 |
| | else: |
| | c2 = -c2 |
| | c2[:c1.size] += c1 |
| | ret = c2 |
| | return trimseq(ret) |
| |
|
| |
|
| | def _fit(vander_f, x, y, deg, rcond=None, full=False, w=None): |
| | """ |
| | Helper function used to implement the ``<type>fit`` functions. |
| | |
| | Parameters |
| | ---------- |
| | vander_f : function(array_like, int) -> ndarray |
| | The 1d vander function, such as ``polyvander`` |
| | c1, c2 |
| | See the ``<type>fit`` functions for more detail |
| | """ |
| | x = np.asarray(x) + 0.0 |
| | y = np.asarray(y) + 0.0 |
| | deg = np.asarray(deg) |
| |
|
| | |
| | if deg.ndim > 1 or deg.dtype.kind not in 'iu' or deg.size == 0: |
| | raise TypeError("deg must be an int or non-empty 1-D array of int") |
| | if deg.min() < 0: |
| | raise ValueError("expected deg >= 0") |
| | if x.ndim != 1: |
| | raise TypeError("expected 1D vector for x") |
| | if x.size == 0: |
| | raise TypeError("expected non-empty vector for x") |
| | if y.ndim < 1 or y.ndim > 2: |
| | raise TypeError("expected 1D or 2D array for y") |
| | if len(x) != len(y): |
| | raise TypeError("expected x and y to have same length") |
| |
|
| | if deg.ndim == 0: |
| | lmax = deg |
| | order = lmax + 1 |
| | van = vander_f(x, lmax) |
| | else: |
| | deg = np.sort(deg) |
| | lmax = deg[-1] |
| | order = len(deg) |
| | van = vander_f(x, lmax)[:, deg] |
| |
|
| | |
| | lhs = van.T |
| | rhs = y.T |
| | if w is not None: |
| | w = np.asarray(w) + 0.0 |
| | if w.ndim != 1: |
| | raise TypeError("expected 1D vector for w") |
| | if len(x) != len(w): |
| | raise TypeError("expected x and w to have same length") |
| | |
| | |
| | lhs = lhs * w |
| | rhs = rhs * w |
| |
|
| | |
| | if rcond is None: |
| | rcond = len(x)*np.finfo(x.dtype).eps |
| |
|
| | |
| | if issubclass(lhs.dtype.type, np.complexfloating): |
| | scl = np.sqrt((np.square(lhs.real) + np.square(lhs.imag)).sum(1)) |
| | else: |
| | scl = np.sqrt(np.square(lhs).sum(1)) |
| | scl[scl == 0] = 1 |
| |
|
| | |
| | c, resids, rank, s = np.linalg.lstsq(lhs.T/scl, rhs.T, rcond) |
| | c = (c.T/scl).T |
| |
|
| | |
| | if deg.ndim > 0: |
| | if c.ndim == 2: |
| | cc = np.zeros((lmax+1, c.shape[1]), dtype=c.dtype) |
| | else: |
| | cc = np.zeros(lmax+1, dtype=c.dtype) |
| | cc[deg] = c |
| | c = cc |
| |
|
| | |
| | if rank != order and not full: |
| | msg = "The fit may be poorly conditioned" |
| | warnings.warn(msg, RankWarning, stacklevel=2) |
| |
|
| | if full: |
| | return c, [resids, rank, s, rcond] |
| | else: |
| | return c |
| |
|
| |
|
| | def _pow(mul_f, c, pow, maxpower): |
| | """ |
| | Helper function used to implement the ``<type>pow`` functions. |
| | |
| | Parameters |
| | ---------- |
| | mul_f : function(array_like, array_like) -> ndarray |
| | The ``<type>mul`` function, such as ``polymul`` |
| | c : array_like |
| | 1-D array of array of series coefficients |
| | pow, maxpower |
| | See the ``<type>pow`` functions for more detail |
| | """ |
| | |
| | [c] = as_series([c]) |
| | power = int(pow) |
| | if power != pow or power < 0: |
| | raise ValueError("Power must be a non-negative integer.") |
| | elif maxpower is not None and power > maxpower: |
| | raise ValueError("Power is too large") |
| | elif power == 0: |
| | return np.array([1], dtype=c.dtype) |
| | elif power == 1: |
| | return c |
| | else: |
| | |
| | |
| | prd = c |
| | for i in range(2, power + 1): |
| | prd = mul_f(prd, c) |
| | return prd |
| |
|
| |
|
| | def _deprecate_as_int(x, desc): |
| | """ |
| | Like `operator.index`, but emits a deprecation warning when passed a float |
| | |
| | Parameters |
| | ---------- |
| | x : int-like, or float with integral value |
| | Value to interpret as an integer |
| | desc : str |
| | description to include in any error message |
| | |
| | Raises |
| | ------ |
| | TypeError : if x is a non-integral float or non-numeric |
| | DeprecationWarning : if x is an integral float |
| | """ |
| | try: |
| | return operator.index(x) |
| | except TypeError as e: |
| | |
| | try: |
| | ix = int(x) |
| | except TypeError: |
| | pass |
| | else: |
| | if ix == x: |
| | warnings.warn( |
| | f"In future, this will raise TypeError, as {desc} will " |
| | "need to be an integer not just an integral float.", |
| | DeprecationWarning, |
| | stacklevel=3 |
| | ) |
| | return ix |
| |
|
| | raise TypeError(f"{desc} must be an integer") from e |
| |
|
| |
|
| | def format_float(x, parens=False): |
| | if not np.issubdtype(type(x), np.floating): |
| | return str(x) |
| |
|
| | opts = np.get_printoptions() |
| |
|
| | if np.isnan(x): |
| | return opts['nanstr'] |
| | elif np.isinf(x): |
| | return opts['infstr'] |
| |
|
| | exp_format = False |
| | if x != 0: |
| | a = absolute(x) |
| | if a >= 1.e8 or a < 10**min(0, -(opts['precision']-1)//2): |
| | exp_format = True |
| |
|
| | trim, unique = '0', True |
| | if opts['floatmode'] == 'fixed': |
| | trim, unique = 'k', False |
| |
|
| | if exp_format: |
| | s = dragon4_scientific(x, precision=opts['precision'], |
| | unique=unique, trim=trim, |
| | sign=opts['sign'] == '+') |
| | if parens: |
| | s = '(' + s + ')' |
| | else: |
| | s = dragon4_positional(x, precision=opts['precision'], |
| | fractional=True, |
| | unique=unique, trim=trim, |
| | sign=opts['sign'] == '+') |
| | return s |
| |
|
