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[3.11] gh-85417: Clarify behaviour on branch cuts in cmath module (GH-102046) #102276

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66 changes: 38 additions & 28 deletions Doc/library/cmath.rst
Original file line number Diff line number Diff line change
Expand Up @@ -15,11 +15,27 @@ the function is then applied to the result of the conversion.

.. note::

On platforms with hardware and system-level support for signed
zeros, functions involving branch cuts are continuous on *both*
sides of the branch cut: the sign of the zero distinguishes one
side of the branch cut from the other. On platforms that do not
support signed zeros the continuity is as specified below.
For functions involving branch cuts, we have the problem of deciding how to
define those functions on the cut itself. Following Kahan's "Branch cuts for
complex elementary functions" paper, as well as Annex G of C99 and later C
standards, we use the sign of zero to distinguish one side of the branch cut
from the other: for a branch cut along (a portion of) the real axis we look
at the sign of the imaginary part, while for a branch cut along the
imaginary axis we look at the sign of the real part.

For example, the :func:`cmath.sqrt` function has a branch cut along the
negative real axis. An argument of ``complex(-2.0, -0.0)`` is treated as
though it lies *below* the branch cut, and so gives a result on the negative
imaginary axis::

>>> cmath.sqrt(complex(-2.0, -0.0))
-1.4142135623730951j

But an argument of ``complex(-2.0, 0.0)`` is treated as though it lies above
the branch cut::

>>> cmath.sqrt(complex(-2.0, 0.0))
1.4142135623730951j


Conversions to and from polar coordinates
Expand All @@ -44,14 +60,11 @@ rectangular coordinates to polar coordinates and back.

.. function:: phase(x)

Return the phase of *x* (also known as the *argument* of *x*), as a
float. ``phase(x)`` is equivalent to ``math.atan2(x.imag,
x.real)``. The result lies in the range [-\ *π*, *π*], and the branch
cut for this operation lies along the negative real axis,
continuous from above. On systems with support for signed zeros
(which includes most systems in current use), this means that the
sign of the result is the same as the sign of ``x.imag``, even when
``x.imag`` is zero::
Return the phase of *x* (also known as the *argument* of *x*), as a float.
``phase(x)`` is equivalent to ``math.atan2(x.imag, x.real)``. The result
lies in the range [-\ *π*, *π*], and the branch cut for this operation lies
along the negative real axis. The sign of the result is the same as the
sign of ``x.imag``, even when ``x.imag`` is zero::

>>> phase(complex(-1.0, 0.0))
3.141592653589793
Expand Down Expand Up @@ -92,8 +105,8 @@ Power and logarithmic functions
.. function:: log(x[, base])

Returns the logarithm of *x* to the given *base*. If the *base* is not
specified, returns the natural logarithm of *x*. There is one branch cut, from 0
along the negative real axis to -∞, continuous from above.
specified, returns the natural logarithm of *x*. There is one branch cut,
from 0 along the negative real axis to -∞.


.. function:: log10(x)
Expand All @@ -112,9 +125,9 @@ Trigonometric functions

.. function:: acos(x)

Return the arc cosine of *x*. There are two branch cuts: One extends right from
1 along the real axis to ∞, continuous from below. The other extends left from
-1 along the real axis to -∞, continuous from above.
Return the arc cosine of *x*. There are two branch cuts: One extends right
from 1 along the real axis to ∞. The other extends left from -1 along the
real axis to -∞.


.. function:: asin(x)
Expand All @@ -125,9 +138,8 @@ Trigonometric functions
.. function:: atan(x)

Return the arc tangent of *x*. There are two branch cuts: One extends from
``1j`` along the imaginary axis to ``∞j``, continuous from the right. The
other extends from ``-1j`` along the imaginary axis to ``-∞j``, continuous
from the left.
``1j`` along the imaginary axis to ``∞j``. The other extends from ``-1j``
along the imaginary axis to ``-∞j``.


.. function:: cos(x)
Expand All @@ -151,23 +163,21 @@ Hyperbolic functions
.. function:: acosh(x)

Return the inverse hyperbolic cosine of *x*. There is one branch cut,
extending left from 1 along the real axis to -∞, continuous from above.
extending left from 1 along the real axis to -∞.


.. function:: asinh(x)

Return the inverse hyperbolic sine of *x*. There are two branch cuts:
One extends from ``1j`` along the imaginary axis to ``∞j``,
continuous from the right. The other extends from ``-1j`` along
the imaginary axis to ``-∞j``, continuous from the left.
One extends from ``1j`` along the imaginary axis to ``∞j``. The other
extends from ``-1j`` along the imaginary axis to ``-∞j``.


.. function:: atanh(x)

Return the inverse hyperbolic tangent of *x*. There are two branch cuts: One
extends from ``1`` along the real axis to ``∞``, continuous from below. The
other extends from ``-1`` along the real axis to ``-∞``, continuous from
above.
extends from ``1`` along the real axis to ``∞``. The other extends from
``-1`` along the real axis to ``-∞``.


.. function:: cosh(x)
Expand Down
Original file line number Diff line number Diff line change
@@ -0,0 +1 @@
Update :mod:`cmath` documentation to clarify behaviour on branch cuts.