The building block of constant k filters is the half-section "L" network, composed of a series
impedance Z, and a shunt
admittance Y. The "k" in "constant k" is the value given by, :k^2=\frac{Z}{Y} Thus,
k will have units of impedance, that is,
ohms. It is readily apparent that in order for
k to be constant,
Y must be the
dual impedance of
Z. A physical interpretation of k can be given by observing that
k is the limiting value of
Zi as the size of the section (in terms of values of its components, such as inductances, capacitances, etc.) approaches zero, while keeping
k at its initial value. Thus,
k is the
characteristic impedance,
Z0, of the transmission line that would be formed by these infinitesimally small sections. It is also the image impedance of the section at
resonance, in the case of band-pass filters, or at
ω = 0 in the case of low-pass filters. For example, the pictured low-pass half-section has :k = \sqrt{\frac{i\omega L}{i \omega C}} = \sqrt{\frac{L}{C}}. Elements
L and
C can be made arbitrarily small while retaining the same value of
k.
Z and
Y however, are both approaching zero, and from the formulae (below) for image impedances, :\lim_{Z,Y \to 0}Z_\mathrm i=k.
Image impedance The image impedances of the section are given by :{Z_\mathrm{iT}}^2=Z^2 + k^2 and :\frac{1}{{Z_\mathrm{i\Pi}}^2}={Y_\mathrm{i\Pi}}^2=Y^2 + \frac{1}{k^2} Given that the filter does not contain any resistive elements, the image impedance in the pass band of the filter is purely
real and in the stop band it is purely
imaginary. For example, for the pictured low-pass half-section, :{Z_\mathrm{iT}}^2=-(\omega L)^2 + \frac{L}{C} The transition occurs at a
cut-off frequency given by :\omega_c=\frac{1}{\sqrt{LC}} Below this
frequency, the image impedance is real, :Z_\mathrm{iT}=L\sqrt{\omega_c^2-\omega^2} Above the cut-off frequency the image impedance is imaginary, :Z_\mathrm{iT}=iL\sqrt{\omega^2-\omega_c^2}
Transmission parameters of a constant k prototype low-pass filter for a single half-section showing attenuation in
nepers and phase change in
radians. The
transmission parameters for a general constant k half-section are given by :\gamma=\sinh^{-1}\frac{Z}{k} and for a chain of
n half-sections :\gamma_n=n\gamma\,\! For the low-pass L-shape section, below the cut-off frequency, the transmission parameters are given by ==Cascading sections==