>>> (float('inf')+0j)*1
(inf+nanj)
Why? This caused a nasty bug in my code.
Why isn't 1
the multiplicative identity, giving (inf + 0j)
?
>>> (float('inf')+0j)*1
(inf+nanj)
Why? This caused a nasty bug in my code.
Why isn't 1
the multiplicative identity, giving (inf + 0j)
?
The 1
is converted to a complex number first, 1 + 0j
, which then leads to an inf * 0
multiplication, resulting in a nan
.
(inf + 0j) * 1
(inf + 0j) * (1 + 0j)
inf * 1 + inf * 0j + 0j * 1 + 0j * 0j
# ^ this is where it comes from
inf + nan j + 0j - 0
inf + nan j
1
is cast to 1 + 0j
.
Commented
Sep 20, 2019 at 16:28
array([inf+0j])*1
also evaluates to array([inf+nanj])
. Assuming that the actual multiplication happens somewhere in C/C++ code, would this mean that they wrote custom code to emulate the CPython behavior, rather than using _Complex or std::complex?
numpy
has one central class ufunc
from which almost every operator and function derives. ufunc
takes care of broadcasting managing strides all that tricky admin that makes working with arrays so convenient. More precisely the split of labor between a specific operator and the general machinery is that the specific operator implements a set of "innermost loops" for each combination of input and output element types it wants to handle. The general machinery takes care of any outer loops and selects the best match innermost loop ...
Commented
Sep 22, 2019 at 9:55
types
attribute for np.multiply
this yields ['??->?', 'bb->b', 'BB->B', 'hh->h', 'HH->H', 'ii->i', 'II->I', 'll->l', 'LL->L', 'qq->q', 'QQ->Q', 'ee->e', 'ff->f', 'dd->d', 'gg->g', 'FF->F', 'DD->D', 'GG->G', 'mq->m', 'qm->m', 'md->m', 'dm->m', 'OO->O']
we can see that there are almost no mixed types, in particular, none that mix float "efdg"
with complex "FDG"
.
Commented
Sep 22, 2019 at 10:02
Mechanistically, the accepted answer is, of course, correct, but I would argue that a deeper ansswer can be given.
First, it is useful to clarify the question as
@PeterCordes does in a comment: "Is there a multiplicative identity for
complex numbers that does work on inf + 0j?" or in other words is what OP
sees a weakness in the computer implementation of complex multiplication or is
there something conceptually unsound with inf+0j
Using polar coordinates we can view complex multiplication as a scaling and a rotation. Rotating an infinite "arm" even by 0 degrees as in the case of multiplying by one we cannot expect to place its tip with finite precision.
So indeed, there is something fundamentally not right with inf+0j
, namely,
that as soon as we are at infinity a finite offset becomes meaningless.
Background: The "big thing" around which this question revolves is the matter of extending a system of numbers (think reals or complex numbers). One reason one might want to do that is to add some concept of infinity, or to "compactify" if one happens to be a mathematician. There are other reasons, too (https://en.wikipedia.org/wiki/Galois_theory, https://en.wikipedia.org/wiki/Non-standard_analysis), but we are not interested in those here.
The tricky bit about such an extension is, of course, that we want these new numbers to fit into the existing arithmetic. The simplest way is to add a single element at infinity (https://en.wikipedia.org/wiki/Alexandroff_extension) and make it equal anything but zero divided by zero. This works for the reals (https://en.wikipedia.org/wiki/Projectively_extended_real_line) and the complex numbers (https://en.wikipedia.org/wiki/Riemann_sphere).
While the one point compactification is simple and mathematically sound, "richer" extensions comprising multiple infinties have been sought. The IEEE 754 standard for real floating point numbers has +inf and -inf (https://en.wikipedia.org/wiki/Extended_real_number_line). Looks
natural and straightforward but already forces us to jump through hoops and
invent stuff like -0
https://en.wikipedia.org/wiki/Signed_zero
What about more-than-one-inf extensions of the complex plane?
In computers, complex numbers are typically implemented by sticking two fp reals together one for the real and one for the imaginary part. That is perfectly fine as long as everything is finite. As soon, however, as infinities are considered things become tricky.
The complex plane has a natural rotational symmetry, which ties in nicely with complex arithmetic as multiplying the entire plane by e^phij is the same as a phi radian rotation around 0
.
Now, to keep things simple, complex fp simply uses the extensions (+/-inf, nan etc.) of the underlying real number implementation. This choice may seem so natural it isn't even perceived as a choice, but let's take a closer look at what it implies. A simple visualization of this extension of the complex plane looks like (I = infinite, f = finite, 0 = 0)
I IIIIIIIII I
I fffffffff I
I fffffffff I
I fffffffff I
I fffffffff I
I ffff0ffff I
I fffffffff I
I fffffffff I
I fffffffff I
I fffffffff I
I IIIIIIIII I
But since a true complex plane is one that respects complex multiplication, a more informative projection would be
III
I I
fffff
fffffff
fffffffff
I fffffffff I
I ffff0ffff I
I fffffffff I
fffffffff
fffffff
fffff
I I
III
In this projection we see the "uneven distribution" of infinities that is not only ugly but also the root of problems of the kind OP has suffered: Most infinities (those of the forms (+/-inf, finite) and (finite, +/-inf) are lumped together at the four principal directions all other directions are represented by just four infinities (+/-inf, +-inf). It shouldn't come as a surprise that extending complex multiplication to this geometry is a nightmare.
Annex G of the C99 spec tries its best to make it work, including bending the rules on how inf
and nan
interact (essentially inf
trumps nan
). OP's problem is sidestepped by not promoting reals and a proposed purely imaginary type to complex, but having the real 1 behave differently from the complex 1 doesn't strike me as a solution. Tellingly, Annex G stops short of fully specifying what the product of two infinities should be.
It is tempting to try and fix these problems by choosing a better geometry of infinities. In analogy to the extended real line we could add one infinity for each direction. This construction is similar to the projective plane but doesn't lump together opposite directions. Infinities would be represented in polar coordinates inf x e^{2 omega pi i}, defining products would be straightforward. In particular, OP's problem would be solved quite naturally.
But this is where the good news ends. In a way we can be hurled back to square one by---not unreasonably---requiring that our newstyle infinities support functions that extract their real or imaginary parts. Addition is another problem; adding two nonantipodal infinities we'd have to set the angle to undefined i.e. nan
(one could argue the angle must lie between the two input angles but there is no simple way of representing that "partial nan-ness")
In view of all this maybe the good old one point compactification is the safest thing to do. Maybe the authors of Annex G felt the same when mandating a function cproj
that lumps all the infinities together.
Here is a related question answered by people more competent on the subject matter than I am.
nan != nan
. I understand that this answer is half-joking, but I fail to see why it should be helpful to the OP the way it's written.
Commented
Sep 21, 2019 at 0:37
==
(and given they accepted the other answer), it seems it was just a problem of how the OP expressed the title. I reworded the title to fix that inconsistency. (Intentionally invaliding the first half of this answer because I agree with @cmaster: that isn't what this question was asking about).
Commented
Sep 21, 2019 at 3:02
This is an implementation detail of how complex multiplication is implemented in CPython. Unlike other languages (e.g. C or C++), CPython takes a somewhat simplistic approach:
Py_complex
_Py_c_prod(Py_complex a, Py_complex b)
{
Py_complex r;
r.real = a.real*b.real - a.imag*b.imag;
r.imag = a.real*b.imag + a.imag*b.real;
return r;
}
One problematic case with the above code would be:
(0.0+1.0*j)*(inf+inf*j) = (0.0*inf-1*inf)+(0.0*inf+1.0*inf)j
= nan + nan*j
However, one would like to have -inf + inf*j
as result.
In this respect other languages are not far ahead: complex number multiplication was for long a time not part of the C standard, included only in C99 as appendix G, which describes how a complex multiplication should be performed - and it is not as simple as the school formula above! The C++ standard doesn't specify how complex multiplication should work, thus most compiler implementations are falling back to C-implementation, which might be C99 conforming (gcc, clang) or not (MSVC).
For the above "problematic" example, C99-compliant implementations (which are more complicated than the school formula) would give (see live) the expected result:
(0.0+1.0*j)*(inf+inf*j) = -inf + inf*j
Even with C99 standard, an unambiguous result is not defined for all inputs and it might be different even for C99-compliant versions.
Another side effect of float
not being promoted to complex
in C99 is that multiplyinginf+0.0j
with 1.0
or 1.0+0.0j
can lead to different results (see here live):
(inf+0.0j)*1.0 = inf+0.0j
(inf+0.0j)*(1.0+0.0j) = inf-nanj
, imaginary part being -nan
and not nan
(as for CPython) doesn't play a role here, because all quiet nans are equivalent (see this), even some of them have sign-bit set (and thus printed as "-", see this) and some not.Which is at least counter-intuitive.
My key take-away from it is: there is nothing simple about "simple" complex number multiplication (or division) and when switching between languages or even compilers one must brace oneself for subtle bugs/differences.
printf
and similar works with double: they look at the sign-bit to decide whether "-" should be printed or not (no matter whether it is nan or not). So you are right, there is no meaningful difference between "nan" and "-nan", fixing this part of the answer soon.
Funny definition from Python. If we are solving this with a pen and paper I would say that expected result would be expected: (inf + 0j)
as you pointed out because we know that we mean the norm of 1
so (float('inf')+0j)*1 =should= ('inf'+0j)
:
But that is not the case as you can see... when we run it we get:
>>> Complex( float('inf') , 0j ) * 1
result: (inf + nanj)
Python understands this *1
as a complex number and not the norm of 1
so it interprets as *(1+0j)
and the error appears when we try to do inf * 0j = nanj
as inf*0
can't be resolved.
What you actually want to do (assuming 1 is the norm of 1):
Recall that if z = x + iy
is a complex number with real part x and imaginary part y, the complex conjugate of z
is defined as z* = x − iy
, and the absolute value, also called the norm of z
is defined as:
Assuming 1
is the norm of 1
we should do something like:
>>> c_num = complex(float('inf'),0)
>>> value = 1
>>> realPart=(c_num.real)*value
>>> imagPart=(c_num.imag)*value
>>> complex(realPart,imagPart)
result: (inf+0j)
not very intuitive I know... but sometimes coding languages get defined in a different way from what we are used in our day to day.