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Butterworth BandStop Filter: BSFB



BSFB models represent lumped-element Butterworth bandstop filters. They offer simplicity and a compromise between high selectivity and flat group delay.


Name Description Unit Type Default
ID Element ID Text BSFB1
N Number of resonators in the filter   3
FP1 Lower frequency edge of passband (when Qu is infinite). Frequency 0.5 GHz
FP2 Upper frequency edge of passband (when Qu is infinite). Frequency 1.5 GHz
*AP Maximum passband attenuation (when Qu is infinite). DB 3.0103 dB
*RS Expected source resistance. Resistance 50 Ohm
*RL Expected load resistance Resistance 50 Ohm
*QU Average unloaded Q of filter resonators   1e12

* indicates a secondary parameter

Parameter Restrictions and Recommendations

  1. 0 < N < 29

  2. 0 < FP1

  3. 0 < FP2

  4. 0 < AP Recommend AP greater than or equal to 0.001 dB.

  5. 0 < RS

  6. 0 < RL

  7. 0 < QU. Recommend QU less than or equal to 1012.

Implementation Details

The model is implemented as a short-circuit admittance matrix, whose equivalent transfer function squared magnitude is that of a Butterworth filter:


and a lowpass-to-bandpass (not lowpass-to-bandstop) frequency transformation has been applied:

_FREQ is the variable containing the project frequency, and the admittances are:


This element does not have an assigned layout cell. You can assign artwork cells to any element. See “Assigning Artwork Cells to Layout of Schematic Elements” for details.

Recommendations for Use

Note that this model behaves as if it has ideal impedance transformers at its ports, so there is no attenuation due to mismatched source and load impedances. The model expects that the source impedance will equal RS and that the load impedance will equal RL, but RS need not equal RL for ideal transmission (as would normally be the case).


[1] Rolf Schaumann, Mohammed S. Ghausi, and Kenneth R. Laker, Design of Analog Filters: Passive, Active RC, and Switched Capacitor, (Prentice-Hall, 1990), pp. 40-44.

[2] Louis Weinberg, Network Analysis and Synthesis, (Robert E. Krieger Publishing, 1975), pp. 493-498.

[3] Adel S. Sedra and Peter O. Brackett, Filter Theory and Design: Active and Passive, (Matrix Publishers, 1978), pp. 105-111.

[4] George L. Matthaei, Leo Young, and E. M. T. Jones, Microwave Filters, Impedance-Matching Networks, and Coupling Structures, (Artech House, 1980), pp. 149-161.

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