Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I would like to create numpy.ndarray objects that hold complex integer values in them. NumPy does have complex support built-in, but for floating-point formats (float and double) only; I can create an ndarray with dtype='cfloat', for example, but there is no analogous dtype='cint16'. I would like to be able to create arrays that hold complex values represented using either 8- or 16-bit integers.

I found this mailing list post from 2007 where someone inquired about such support. The only workaround they recommended involved defining a new dtype that holds pairs of integers. This seems to represent each array element as a tuple of 2 values, but it's not clear what other work would need to be done in order to make the resulting datatype work seamlessly with arithmetic functions.

I also considered another approach based on registration of user-defined types with NumPy. I don't have a problem with going to the C API to set this up if it will work well. However, the documentation for the type descriptor strucure seems to suggest that the type's kind field only supports signed/unsigned integer, floating-point, and complex floating-point numeric types. It's not clear that I would be able to get anywhere trying to define a complex integer type.

Any recommendations on an approach that may work?

Edit: One more thing; whatever scheme I select must be amenable to wrapping of existing complex integer buffers without performing a copy. That is, I would like to be able to use PyArray_SimpleNewFromData() to expose the buffer to Python without having to make a copy of the buffer first. The buffer would be in interleaved real/imaginary format already, and would either be an array of int8_t or int16_t.

share|improve this question
2  
This is pretty - non-standard. How do you define division for this type? for example, what do you expect if you do (2+1j)/(3+0j)? Do you expect it to give you a complex result or (0+0j)? –  mgilson Dec 13 '12 at 16:02
2  
Out of curiosity, when in signal processing are complex integers used? I can't think of examples off the top of my head. –  acjay Dec 13 '12 at 17:57
1  
@mgilson: Likely addition/subtraction and multiplication. I also just thought of another constraint that I'll edit into the post. –  Jason R Dec 13 '12 at 18:23
1  
@JasonR -- I unfortunately don't have time to work on something of this magnitude right now, but it seems that you could accomplish something like this via a subclass using view-casting. You could add properties imag and real which would return views into the appropriate portions of the arrays. And you could override __mul__,__add__,__sub__ accordingly, but I don't know exactly how numpy-like you actually need this to be, so I can't say for sure. –  mgilson Dec 13 '12 at 18:38
5  
This is silly. Just do the work with floating point arithmetic, and assume all floating point values along the way. Then you won't face a type conversion (since you expect floats). I've written many digital signal processing modules for work in NumPy and even when working with things that specifically depend on Gaussian integer properties (root locus work or some special Laplace transforms for example), this type conversion has never been an issue. Not from a performance (speed, round-off) perspective nor a math perspective. –  prpl.mnky.dshwshr Jan 16 '13 at 20:51

1 Answer 1

Python and hence Numpy does support complex numbers, if you want complex integers, just use np.round or ignore the decimal part.

e.g.

import numpy as np
#Create 100 complex numbers in a 1D array
a=100*np.random.sample(100)+(100*np.random.sample(100)*1j)
#Reshape to a 2D array
np.round(a)
a.reshape(10,10)

#Get the real and imag parts of a couple x/y points as integers
print int(a[1:2].real)
print int(a[3:4].imag)
share|improve this answer
1  
The OP wants complex integers. –  Vladimir F Feb 7 '13 at 13:51
    
That's what I was trying to say, use complex and treat as an integer. –  Jason Morgan Feb 7 '13 at 13:57
    
This works for many applications. I suspect those down voting don't understand the problem. –  Henry Gomersall Jul 17 at 7:39

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.