Radar Cross Section

This document records some possible useful rcs-related equations for my simulations 😄.

RCS Definition¹

The RCS represents an equivalent aperture surface area of the target, which captures a certain amount of incident radiation, and which, if re-radiated isotropically, would produce an equivalent scattered field at the receiver.

• For 2d target:

  \[\begin{aligned} \sigma_{2d}=\begin{cases}\lim_\limits{\rho \to \infty}\left[2\pi \rho \frac{S^s}{S^i}\right]\\ \lim_\limits{\rho \to \infty}\left[2\pi \rho \frac{|E^s|^2}{|E^i|^2}\right]\\ \lim_\limits{\rho \to \infty}\left[2\pi \rho \frac{|H^s|^2}{|H^i|^2}\right] \end{cases} \end{aligned}. \]

• For 3d target:

  \[\begin{aligned} \sigma_{3d}=\begin{cases}\lim_\limits{r \to \infty}\left[4\pi r^2 \frac{S^s}{S^i}\right]\\ \lim_\limits{r \to \infty}\left[4\pi r^2 \frac{|E^s|^2}{|E^i|^2}\right]\\ \lim_\limits{r \to \infty}\left[4\pi r^2 \frac{|H^s|^2}{|H^i|^2}\right] \end{cases} \end{aligned}. \]

• Where \(\rho,r=\) distance from target to observation point.

  • \(S^s,S^i=\) scattered, incident power density.
  • \(E^s,E^i\) = scattered, incident electric fields.
  • \(H^s,H^i=\) scattered, incident magnetic fields.

Monostatic and Bistatic RCS

Assuming a spherical coordinate system defined by \((\rho,\theta,\phi)\), denote the incident wave direction as \((\theta^i,\phi^i)\) and scattered wave direction as \((\theta_s,\phi_s)\).

• RCS measured by \(\theta_s=\theta_i\) and \(\phi_s=\phi_i\) is called monostatic RCS (or backscattered RCS).
• RCS measured by \(\theta_s \neq \theta_i\) and \(\phi_s \neq \phi_i\) is called bistatic RCS.

Remark: In my opinion, monostatic RCS could be considered as a function of frequency and incident angles while bistatic RCS is more complex and can be considered as a function of frequency, incident angle, scattered angle, and bistatic angle.

Monostatic to Bistatic Equivalence²

Kell’s Monostatic-to-Bistatic Theorem³

\[\sigma_{bistatic}(\theta=\beta,f)=\sigma_{monostaic}(\theta=\beta/2,f \sec(\beta/2)). \]

Crispin’s Monostatic-to-Bistatic Equivalence Theorem⁴:

\[\sigma_{bistatic}(\theta=\beta,f)=\sigma_M(\theta=\beta/2,f). \]

Here, \(\beta\) refers to bistatic angle and \(f\) refers to frequency.

Bistatic RCS Estimation of an ellipsoid^{5 6}

Reference⁶ corrects some mistakes of reference⁵.

Considering an ellipsoid with its center at the origin:

\[\frac{x^2}{a^2}+\frac{y^2}{b^2}+\frac{z^2}{c^2}=1, \]

where, \(a\),\(b\),\(c\) represent the length of the three semi-axes of the ellipsoid in the \(x\), \(y\), \(z\) directions respectively.

Denote the incident and scattered wave directions in spherical coordinate form as \((\theta_i,\phi_i)\) and \((\theta_s,\phi_s)\) respectively. Here, \(\theta_i,\theta_s\) refer to the incident and scattered aspect angles while \(\phi_i\), \(\phi_s\) refer to the incident and scattered azimuth angles of the ellipsoid relative to the transmitter and receiver.

• Then the bistatic RCS could be estimated by:

\[\sigma_{bistatic} = \frac{4\pi a^2b^2c^2[(1+\cos \theta_i\cos\theta_s)\cos(\phi_s-\phi_i)+\sin\theta_i\sin\theta_s]^2}{\left[a^2(\sin\theta_i\cos\phi_i+\sin\theta_s\cos\phi_s)^2+b^2(\sin\theta_i\sin\phi_i+\sin\theta_s\sin\phi_s)^2+c^2(\cos\theta_i+\cos\theta_s)^2\right]^2}. \]

• For monostatic case (\(\theta_i = \theta_s=\theta\), \(\phi_i = \phi_s=\phi\)), we have:

\[\sigma_{monostatic}=\frac{\pi a^2b^2c^2}{[a^2\sin^2\theta\cos^2\phi+b^2\sin^2\theta\sin^2\phi+c^2\cos^2\theta]^2}. \]

• When \(a=b=c=r\), we have rcs estimation of a sphere:

  \[\sigma_{monostatic-sphere}=\pi r^2. \]

Radar Range Equation

• Bistatic radar range equation:

  \[P_r=\frac{P_tG_tG_r\sigma_B\lambda^2}{(4\pi)^3R^2_{Tx}R^2_{Rx}}. \]

• Monostatic radar range equation (\(R_{Rx}=R_{Tx}=R\)):

  \[P_{r}=\frac{P_{t}G_tG_r \sigma_{M} \lambda^2}{(4\pi)^3R^4}. \]

  Where:

  • \(P_t\), \(P_r\) refer to transmit and receive power.
  • \(G_t\), \(G_r\) refer to transmit and receive antenna gain.
  • \(\sigma_B\) and \(\sigma_M\) refer to bistatic and monostatic RCS.
  • \(R_{Tx}\), \(R_{Rx}\) refer to distance of transmitter-target and receiver-target.