The essential requirement for a lattice filter is that for it to be constant resistance, the lattice element of the filter must be the
dual of the series element with respect to the
characteristic impedance. That is, :\frac{Z}{R_0}=\frac{R_0}{Z'}. Such a network, when terminated in R0, will have an input resistance of R0 at all frequencies. If the impedance Z is purely reactive such that then the phase shift, φ, inserted by the filter is given by \tan \frac{\varphi}{2} = -\frac{X}{R_0}. The
prototype lattice filter shown here passes low frequencies without modification but phase-shifts high frequencies. That is, it is phase correction for the high end of the band. At low frequencies the phase shift is 0° but as the frequency increases the phase shift approaches 180°. It can be seen qualitatively that this is so by replacing the inductors with open circuits and the capacitors with short circuits, which is what they become at high frequencies. At high frequencies the lattice filter is a cross-over network and will produce 180° phase shift. A 180° phase shift is the same as an inversion in the frequency domain, but is a delay in the time domain. At an
angular frequency of the phase shift is exactly 90° and this is the midpoint of the filter's transfer function.
Low-in-phase section The prototype section can be scaled and transformed to the desired frequency, impedance and bandform by applying the usual
prototype filter transforms. A filter which is in-phase at low frequencies (that is, one that is correcting phase at high frequencies) can be obtained from the prototype with simple scaling factors. The phase response of a scaled filter is given by \tan \frac{\varphi}{2} = -\frac{\omega}{\omega_m}, where ωm is the midpoint frequency and is given by \omega_m = \frac{1}{\sqrt{LC}}.
High-in-phase section A filter that is in-phase at high frequencies (that is, a filter to correct low-end phase) can be obtained by applying the
high-pass transformation to the prototype filter. However, it can be seen that due to the lattice topology this is also equivalent to a crossover on the output of the corresponding low-in-phase section. This second method may not only make calculation easier but it is also a useful property where lines are being equalised on a temporary basis, for instance for
outside broadcasts. It is desirable to keep the number of different types of adjustable sections to a minimum for temporary work and being able to use the same section for both high end and low end correction is a distinct advantage.
Band equalise section A filter that corrects a limited band of frequencies (that is, a filter that is in-phase everywhere except in the band being corrected) can be obtained by applying the
band-stop transformation to the prototype filter. This results in resonant elements appearing in the filter's network. An alternative, and possibly more accurate, view of this filter's response is to describe it as a phase change that varies from 0° to 360° with increasing frequency. At 360° phase shift, of course, the input and output are now back in phase with each other. ==Resistance compensation==