5

I'm a beginner at Julia and am using it to compute the power of a complex number as a subroutine in a larger scientific task where I run

array = [1im^(i-j) for i in 1:5, j in 1:5]

but I get the following DomainError :

DomainError with -1:
Cannot raise an integer x to a negative power -1.
Convert input to float.

Particularly, when I run the for loop and print the value for each (i,j), the same error occurs at (i=2,j=1). I'll be very grateful if someone can help me with this. What seems to be wrong with my code? How can I overcome this error?

Thank you in advance.

1 Answer 1

5

Use a float as a base like this (this is what the error message recommends you to do):

julia> [(1.0im)^(i-j) for i in 1:5, j in 1:5]
5×5 Matrix{ComplexF64}:
  1.0+0.0im   0.0-1.0im  -1.0-0.0im  -0.0+1.0im   1.0+0.0im
  0.0+1.0im   1.0+0.0im   0.0-1.0im  -1.0-0.0im  -0.0+1.0im
 -1.0+0.0im   0.0+1.0im   1.0+0.0im   0.0-1.0im  -1.0-0.0im
 -0.0-1.0im  -1.0+0.0im   0.0+1.0im   1.0+0.0im   0.0-1.0im
  1.0-0.0im  -0.0-1.0im  -1.0+0.0im   0.0+1.0im   1.0+0.0im

or like this

julia> [float(im)^(i-j) for i in 1:5, j in 1:5]
5×5 Matrix{ComplexF64}:
  1.0+0.0im   0.0-1.0im  -1.0-0.0im  -0.0+1.0im   1.0+0.0im
  0.0+1.0im   1.0+0.0im   0.0-1.0im  -1.0-0.0im  -0.0+1.0im
 -1.0+0.0im   0.0+1.0im   1.0+0.0im   0.0-1.0im  -1.0-0.0im
 -0.0-1.0im  -1.0+0.0im   0.0+1.0im   1.0+0.0im   0.0-1.0im
  1.0-0.0im  -0.0-1.0im  -1.0+0.0im   0.0+1.0im   1.0+0.0im

The error follows from this definition:

^(z::Complex{<:Integer}, n::Integer) = power_by_squaring(z,n) # DomainError for n<0
2
  • Do you know why 1im^-1 works (returning 0.0 - 1.0im), but 1im^(1-2) errors? Is there some type of hidden conversion to float that can take place when -1 is provided as a literal but not when it's the result of an Int expression? Commented Jun 16, 2021 at 17:56
  • 1
    it is because im^-1 is a compile time constant (so it is computed at compilation time), while im^(2-1) is evaluated at run time. Now the issue is that Julia tries to be type stable here. im^-1 is evaluated at compile time so its type is known when things are compiled and can be properly propagated. However allowing im^(2-1) evaluated at run time would mean that there would be type instability thus Julia designers decided to disallow it. It is essentially the same reason why sqrt(-1) throws an error. But I agree that with negative powers it is a bit confusing. Commented Jun 16, 2021 at 18:02

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service and acknowledge you have read our privacy policy.

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