Electromagnetic reverberation chamber

A look inside the (large) Reverberation Chamber at the Otto-von-Guericke-University Magdeburg, Germany. On the left side is the vertical Mode Stirrer (or Tuner), that changes the electromagnetic boundaries to ensure a (statistically) homogeneous field distribution.

An electromagnetic reverberation chamber (also known as a reverb chamber (RVC) or mode-stirred chamber (MSC)) is an environment for electromagnetic compatibility (EMC) testing and other electromagnetic investigations. Electromagnetic reverberation chambers have been introduced first by H.A. Mendes in 1968.[1] A reverberation chamber is screened room with a minimum of absorption of electromagnetic energy. Due to the low absorption very high field strength can be achieved with moderate input power. A reverberation chamber is a cavity resonator with a high Q factor. Thus, the spatial distribution of the electrical and magnetic field strengths is strongly inhomogeneous (standing waves). To reduce this inhomogeneity, one or more tuners (stirrers) are used. A tuner is a construction with large metallic reflectors that can be moved to different orientations in order to achieve different boundary conditions. The Lowest Usable Frequency (LUF) of a reverberation chamber depends on the size of the chamber and the design of the tuner. Small chambers have a higher LUF than large chambers.

The concept of a reverberation chambers is comparable to a microwave oven.

Glossary/notation

Preface

The notation is mainly the same as in the IEC standard 61000-4-21.[2] For statistic quantities like mean and maximal values, a more explicit notation is used in order to emphasize the used domain. Here, spatial domain (subscript s) means that quantities are taken for different chamber positions, and ensemble domain (subscript e) refers to different boundary or excitation conditions (e.g. tuner positions).

General

Statistics

Theory

Cavity resonator

A reverberation chamber is cavity resonator—usually a screened room—that is operated in the overmoded region. To understand what that means we have to investigate cavity resonators briefly.

For rectangular cavities, the resonance frequencies (or eigenfrequencies, or natural frequencies) f_{mnp} are given by


f_{mnp} = \frac{c}{2}\sqrt{\left(\frac{m}{l}\right)^2+\left(\frac{n}{w}\right)^2+\left(\frac{p}{h}\right)^2},

where c is the speed of light, l, w and h are the cavity's length, width and height, and m, n, p are non-negative integers (at most one of those can be zero).

With that equation, the number of modes with an eigenfrequency less than a given limit f, N(f), can be counted. This results in a stepwise function. In principle, two modes—a transversal electric mode TE_{mnp} and a transversal magnetic mode TM_{mnp}—exist for each eigenfrequency.

The fields at the chamber position (x,y,z) are given by

 
  E_x=-\frac{1}{j\omega\epsilon} k_x k_z \cos k_x x \sin k_y y \sin k_z z
  
 
  E_y=-\frac{1}{j\omega\epsilon} k_y k_z \sin k_x x  \cos k_y y \sin k_z z
  
 
  E_z= \frac{1}{j\omega\epsilon} k_{xy}^2 \sin k_x x  \sin k_y y \cos k_z z
  
 
  H_x= k_y \sin k_x x  \cos k_y y \cos k_z z
  
 
  H_y= - k_x \cos k_x x  \sin k_y y \cos k_z z
  
 
  k_r^2=k_x^2+k_y^2+k_z^2,\,   k_x=\frac{m\pi}{l},\,  k_y=\frac{n\pi}{w},\, k_z= \frac{p\pi}{h}\, k_{xy}^2=k_x^2+k_y^2
  
 
  E_x= k_y \cos k_x x  \sin k_y y \sin k_z z
  
 
  E_y=- k_x \sin k_x x  \cos k_y y \sin k_z z
  
 
  H_x=-\frac{1}{j\omega\mu} k_x k_z \sin k_x x  \cos k_y y \cos k_z z
  
 
  H_y=-\frac{1}{j\omega\mu} k_y k_z \cos k_x x  \sin k_y y \cos k_z z
  
 
  H_z= \frac{1}{j\omega\mu} k_{xy}^2 \cos k_x x  \cos  k_y y \sin k_z z
  

Due to the boundary conditions for the E- and H field, some modes do not exist. The restrictions are:[3]

A smooth approximation of N(f), \overline{N}(f), is given by


\overline{N}(f) = \frac{8\pi}{3}lwh\left(\frac{f}{c}\right)^3 - (l+w+h)\frac{f}{c} +\frac{1}{2}.

The leading term is proportional to the chamber volume and to the third power of the frequency. This term is identical to Weyl's formula.

Comparison of the exact and the smoothed number of modes for the Large Magdeburg Reverberation Chamber.

Based on \overline{N}(f) the mode density \overline{n}(f) is given by


\overline{n}(f)=\frac{d\overline{N}(f)}{df} = \frac{8\pi}{c}lwh\left(\frac{f}{c}\right)^2 - (l+w+h)\frac{1}{c}.

An important quantity is the number of modes in a certain frequency interval \Delta f, \overline{N}_{\Delta f}(f), that is given by


\begin{matrix}
\overline{N}_{\Delta f}(f) & = & \int_{f-\Delta f/2}^{f+\Delta f/2} \overline{n}(f) df \\
\ & = & \overline{N}(f+\Delta f/2) - \overline{N}(f-\Delta f/2)\\
\ & \simeq & \frac{8\pi lwh}{c^3} \cdot f^2 \cdot  \Delta f
\end{matrix}

Quality factor

The Quality Factor (or Q Factor) is an important quantity for all resonant systems. Generally, the Q factor is defined by 
Q=\omega\frac{\rm maximum\; stored\; energy}{\rm average\; power\; loss} = \omega \frac{W_s}{P_l},
where the maximum and the average are taken over one cycle, and \omega=2\pi f is the angular frequency.

The factor Q of the TE and TM modes can be calculated from the fields. The stored energy W_s is given by


W_s = \frac{\epsilon}{2}\iiint_V |\vec{E}|^2 dV = \frac{\mu}{2}\iiint_V |\vec{H}|^2 dV.

The loss occurs in the metallic walls. If the wall's electrical conductivity is \sigma and its permeability is \mu, the surface resistance R_s is


R_s = \frac{1}{\sigma\delta_s} = \sqrt{\frac{\pi\mu f}{\sigma}},

where \delta_s=1/\sqrt{\pi\mu\sigma f} is the skin depth of the wall material.

The losses P_l are calculated according to


P_l = \frac{R_s}{2}\iint_S |\vec{H}|^2 dS.

For a rectangular cavity follows[4]

 
 Q_{\rm TE_{mnp}} = 
 \frac{Z_0 lwh}{4R_s} \frac{k_{xy}^2 k_r^3}
 {\zeta l h \left(k_{xy}^4+k_x^2k_z^2 \right) +
 \xi w h \left(k_{xy}^4+k_y^2k_z^2 \right)  +
 lw k_{xy}^2 k_z^2}
 

 \zeta=
  \begin{cases}
    1 & \mbox{if }n\ne 0 \\
  1/2 & \mbox{if }n=0
  \end{cases},\quad
 \xi=
  \begin{cases}
    1 & \mbox{if }m\ne 0 \\
  1/2 & \mbox{if }m=0
  \end{cases}
 

 Q_{\rm TM_{mnp}} = 
 \frac{Z_0 lwh}{4 R_s} \frac{k_{xy}^2 k_r}
 { w(\gamma l+h) k_x^2 +  l(\gamma w+h)k_y^2}
 
 \gamma=
  \begin{cases}
    1 & \mbox{if }p\ne 0 \\
  1/2 & \mbox{if }p=0
  \end{cases}
 

Using the Q values of the individual modes, an averaged Composite Quality Factor \tilde{Q_s} can be derived:[5] 
\frac{1}{\tilde{Q_s}} = \langle\frac{1}{Q_{mnp}}\rangle_{k\le k_r \le k_r+\Delta k}

\tilde{Q_s} = \frac{3}{2} \frac{V}{S\delta_s} \frac{1}{1+\frac{3c}{16f}\left(1/l + 1/w + 1/h \right)}

\tilde{Q_s} includes only losses due to the finite conductivity of the chamber walls and is therefore an upper limit. Other losses are dielectric losses e.g. in antenna support structures, losses due to wall coatings, and leakage losses. For the lower frequency range the dominant loss is due to the antenna used to couple energy to the room (transmitting antenna, Tx) and to monitor the fields in the chamber (receiving antenna, Rx). This antenna loss Q_a is given by 
Q_a = \frac{16\pi^2 V f^3}{c^3 N_{a}},
where N_a is the number of antenna in the chamber.

The quality factor including all losses is the harmonic sum of the factors for all single loss processes:


\frac{1}{Q} = \sum_i \frac{1}{Q_i}

Resulting from the finite quality factor the eigenmodes are broaden in frequency, i.e. a mode can be excited even if the operating frequency does not exactly match the eigenfrequency. Therefore, more eigenmodes are exited for a given frequency at the same time.

The Q-bandwidth {\rm BW}_Q is a measure of the frequency bandwidth over which the modes in a reverberation chamber are correlated. The {\rm BW}_Q of a reverberation chamber can be calculated using the following:

{\rm BW}_Q=\frac{f}{Q}

Using the formula \overline{N}_{\Delta f}(f) the number of modes excited within {\rm BW}_Q results to


M(f)=\frac{8\pi V f^3}{c^3 Q}.

Related to the chamber quality factor is the chamber time constant \tau by


\tau=\frac{Q}{2\pi f}.

That is the time constant of the free energy relaxation of the chamber's field (exponential decay) if the input power is switched off.

See also

Notes

  1. Mendes, H.A.: A new approach to electromagnetic field-strength measurements in shielded enclosures., Wescon Tech. Papers, Los Angeles, CA., August, 1968.
  2. IEC 61000-4-21: Electromagnetic compatibility (EMC) - Part 4-21: Testing and measurement techniques - Reverberation chamber test methods, Ed. 2.0, January, 2011. ()
  3. Cheng, D.K.: Field and Wave Electromagnetics, Addison-Wesley Publishing Company Inc., Edition 2, 1998. ISBN 0-201-52820-7
  4. Chang, K.: Handbook of Microwave and Optical Components, Volume 1, John Willey & Sons Inc., 1989. ISBN 0-471-61366-5.
  5. Liu, B.H., Chang, D.C., Ma, M.T.: Eigenmodes and the Composite Quality Factor of a Reverberating Chamber, NBS Technical Note 1066, National Bureau of Standards, Boulder, CO., August 1983.

References

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