Mm'-type filter
mm'-type filters, also called double-m-derived filters, are a type of electronic filter designed using the image method. They were patented by Otto Zobel in 1932. Like the m-type filter from which it is derived, the mm'-type filter type was intended to provide an improved impedance match into the filter termination impedances and originally arose in connection with telephone frequency division multiplexing. The filter has a similar transfer function to the m-type, having the same advantage of rapid cut-off, but the input impedance remains much more nearly constant if suitable parameters are chosen. In fact, the cut-off performance is better for the mm'-type if like-for-like impedance matching are compared rather than like-for-like transfer function. It also has the same drawback of a rising response in the stopband as the m-type. However, its main disadvantage is its much increased complexity which is the chief reason its use never became widespread. It was only ever intended to be used as the end sections of composite filters, the rest of the filter being made up of other sections such as k-type and m-type sections.
An incidental advantage of the mm'-type is that it has two independent parameters that the designer can adjust. This allows for two different design criteria to be independently optimised.
Background
The mm'-type filter was an extension of Zobel's previous m-type filter, which itself grew out of George Campbell's k-type design. Zobel's m-type is arrived at by applying the m-derivation process to the k-type filter. Completely analogously, the mm'-type is arrived at by applying the m-derived process to the m-type filter. The value of m used in the second transformation is designated m' to distinguish it from m, hence the naming of the filter mm'-type. However, this filter is not a member of the class of filters, general mn-type image filters, which are a generalisation of m-type filters. Rather, it is a double application of the m-derived process and for those filters the arbitrary parameters are usually designated m1, m2, m3 etc., rather than m, mThe importance of the filter lies in its impedance properties. Some of the impedance terms and section terms used in image design theory are pictured in the diagram below. As always, image theory defines quantities in terms of an infinite cascade of two-port sections, and in the case of the filters being discussed, an infinite ladder network of L-sections.
The sections of the hypothetical infinite filter are made up of series impedance elements of 2Z and shunt admittance elements of 2Y. The factor of two is introduced since it is normal to work in terms of half-sections where it disappears. The image impedance of the input and output port of a section,
Zi1 and
Zi2, will generally not be the same. However, for a mid-series section will have the same image impedance on both ports due to symmetry. This image impedance is designated
ZiT due to the "T
" topology of a mid-series section. Likewise, the image impedance of a mid-shunt section is designated
ZiΠ due to the "Π
" topology. Half of such a "T"
or "Π"
section is called a half-section. The image impedances of the half section are dissimilar on the input and output ports but are equal to the mid-series
ZiT on the side presenting the series element and the mid-shunt
ZiΠ on the side presenting the shunt element.A mid-series derived section has precisely the same image impedance,
ZiT, as a k-type mid-series "T
" filter. However, the image impedance of a half-section of such a filter is not the same and is designated
ZiΠm. Similarly, the series element side of a shunt m-derived filter half-section is designated
Z''iTm.Derivation
The m-derived process starts with a k-type filter midsection and transforms it into a m-derived filter with a different transfer function but retaining the same image impedance and passband. Two different results are obtained depending on whether the process began with a T-section or a Π-section. From a T-section, the series Z and shunt Y are multiplied by an arbitrary parameter m. An additional impedance is then inserted in series with Y whose value is that which restores the original image impedance. The half-sections resulting from splitting the T-section, however, will show a different image impedance at the split,ZiΠm
. Two such half-sections cascaded with the ZiT
impedances facing, will form a Π
-section with image impedance ZiΠm
. The m-derived process can now be applied to this new section, but with a new parameter mZiΠm
. Again, the half sections will have a different image impedance at the split ports and this is designated ZiTmm'
.The dual realisation of this filter is obtained in a completely analogous way by first transforming a mid-shunt k-type Π-section, forming the resulting mid-series m-type T-section and then transforming using m
Zimm'
, ZiΠmm'
, which is the dual of ZiTmm'
.The m-derivation transformation can, in principle, be applied ad-infinitum and produce mm'm
Operating frequency
For a low-pass prototype, the cut-off frequency is given by the same expression as for the m-type and the k-type;The pole of attenuation occurs at;
Image impedance
The following expressions for image impedances are all referenced to the low-pass prototype section. They are scaled to the nominal impedance R0 = 1 and the frequencies in those expressions are all scaled to the cut-off frequency ωc = 1."T" port image impedance
The image impedance looking into a "T" topology port of a shunt derived section is given by,For comparison;
"Π" port image impedance
The image impedance looking into a "Π" topology port of a series derived section is given by,For comparison;
Optimisation
Note that can be adjusted independently of m by adjusting mThis amounts to setting the match to be exact at frequencies 0.8062 and 0.9487 rad/s for the prototype filter and the impedance departs less than 2% from nominal from 0 to 0.96 rad/s, that is, nearly all of the passband.
The transfer function of an mm'-type is the same as an m-type with m set to the product mm
Transmission parameters
The operating frequencies, transmission parameters and transfer function are identical to those for the m-type and details can be found in that article if the parameter m is replaced by the product mmPrototype transformations
The plots shown of image impedance and attenuation are the plots of a low-pass prototype filter section. The prototype has a cut-off frequency of ωc=1 rad/s and a nominal impedance R0=1Ω. This is produced by a filter half-section where L=1 henry and C=1 farad. This prototype can be impedance scaled and frequency scaled to the desired values. The low-pass prototype can also be transformed into high-pass, band-pass or band-stop types by application of suitable frequency transformations.Cascading sections
As with all image filters, it is required to match each section into a section of identical image impedance if the theoretical filter response is to be achieved. This is a particular difficulty for the end sections of the filter which are often working into resistive terminations which cannot be matched exactly by an image impedance. Hence the use of the mm'-type as end sections for the filter because of its nearly flat impedance with frequency characteristic in the passband. However, it is not desirable to use it throughout the entire filter. The workhorse of image filters are the k-type sections and these will usually be required somewhere in the filter for good rejection in the stopband well away from cut-off and also because they are the simplest topology and lowest component count. Unfortunately, neither side of a mm'-type can match into a k-type. The solution is to form a composite section from a mm'-type half-section and a m-type section which will match each other on one side if m has the same value for both half-sections. This can, for instance, produce a composite T-section withZiTmm'
facing the termination and ZiT
facing the rest of the filter. The T-section will be matched internally with ZiTm
. This has the additional incidental advantage of producing two poles of attenuation in the stopband at different frequencies. This is a consequence of m and mm