# Complex low pass filters

I am searching for documentation on the behaviour of complex low pass filters, and their application in telecommunications.

Thank you

• I believe that it would be useful you detail some of the documentation you already have, and what is your more specific interest. Aug 26 '15 at 18:24
• I search a document that explains the running of this type of filters, how to realize it in practice and the frequency response of it. Aug 26 '15 at 18:27

A low pass filter has a frequency response that satisfies

$$|H(\omega)|\approx 0,\quad |\omega|>\omega_c\tag{1}$$

where $\omega_c$ is the cut-off frequency. A complex low pass filter must also satisfy

$$H(\omega)\neq H^*(-\omega)\tag{2}$$

which causes its impulse response to be complex-valued. So the frequency response of a complex low pass filter is characterized by Eqs $(1)$ and $(2)$.

In discrete-time, you have the usual convolution sum

$$y[n]=\sum_{k=-\infty}^{\infty}h[k]x[n-k]\tag{3}$$

where $y[n]$ is the output sequence, $x[n]$ is the input sequence, and $h[n]$ is the filter's impulse response. Note that all sequences in $(3)$ are generally complex-valued. If you split up (3) into its real and imaginary part you get

$$y_R[n]=\sum_{k=-\infty}^{\infty}\left(h_R[k]x_R[n-k]-h_I[k]x_I[n-k]\right)\\ y_I[n]=\sum_{k=-\infty}^{\infty}\left(h_R[k]x_I[n-k]+h_I[k]x_R[n-k]\right)\tag{4}$$

where the subscripts $_R$ and $_I$ denote the real and imaginary parts, respectively. From $(4)$ you see that you have to implement two filters, one with impulse response $h_R[n]$ and the other with impulse response $h_I[n]$, and that you have to filter the real part as well as the imaginary part of the input signal with both filters.

As for applications in digital communications, anywhere where you have in-phase and quadrature components, you can model these two signals as a complex signal, and any filtering on this complex signal requires a complex filter (or, at least, a filter with complex input and output). However, in practice you most often encounter two special cases:

1. The filter is actually real-valued but has a complex input and output, i.e. you simply filter the real and imaginary parts of the input signal independently with the same filter. In Eq. $(4)$ that means that $h_I[n]=0$. This is the case when you apply a low pass filter after complex demodulation.

2. The filter is complex-valued but the input signal is real-valued, so you filter one (real-valued) signal with two filters (the real and imaginary parts of the impulse response). In Eq. $(4)$ that means that $x_I[n]=0$. This occurs when you filter a real-valued passband signal with an analytic band pass filter before complex demodulation. (Note that here the filter is a band pass, not a low pass).

A complete complex filtering operation with complex-valued inputs and outputs, and a complex impulse response (as specified by Eq. $(4)$) is used for modelling a digital communication system using an equivalent discrete-time baseband channel. The corresponding baseband channel filter is generally complex-valued.

• If I want to get the Equation of the Complex low pass filter, or the bandpass filter in the continuous form. What is should be? and are there any books which treat this type of filters. Thank's Aug 28 '15 at 15:39
• @AhmedAbrous: Do you mean the equation of the transfer function? The general form is the same, just the coefficients are complex numbers. Aug 28 '15 at 15:42
• Yes I mean the Transfer function to study the system in the frequency domain. I would like to apply this type of filters in power systems. And a documentation also if possible. Aug 28 '15 at 15:45
• @AhmedAbrous: I'm not sure what you need to know. There is no such thing as a "documentation" of a complex low pass filter. Do you know the standard form of the transfer function of a low pass filter? If so, that's what you need, just with complex coefficients. Aug 28 '15 at 15:56
• @AhmedAbrous: You're confusing some terms here. $H(s)$ is the transfer function. The impulse response is a time-domain function, and the transfer function is the Laplace transform of the impulse response. For a continuous-time $N^{th}$ order low pass filter, the transfer function has the general form $$H(s)=\frac{a}{\sum_{i=0}^{N} b_is^i}$$ with some constants $a$ and $b_i$, $i=0,1,\ldots,N$. Aug 28 '15 at 16:06

Your question is sensible. Assuming you're talking about tapped-delay line FIR filters, studying complex-valued FIR filters will teach you a lot about both real- and complex-valued FIR filters. Stating Matt L.'s correct Eq. (2) in words, the freq response of a complex-valued FIR filter is not conjugate-symmetric. This means the filter's magnitude response does not exhibit mirror-image symmetry centered at zero Hz, as do real-valued FIR filters. As Matt L. says, complex FIR filters are generally bandpass filters rather than lowpass filters. As for the time-domain impulse response behavior of complex-valued FIR filters, I discuss that little-known topic in my blog titled: "The Most Interesting FIR Filter Equation in the World" at: http://www.dsprelated.com. Have a look at that blog.