Active reflection coefficient explained

The active reflection coefficient (ARC) is the reflection coefficient for a single antenna element in an array antenna, in the presence of mutual coupling. The active reflection coefficient is a function of frequency in addition to the excitation of the neighboring cells.^[1] In computational electromagnetics, the active reflection coefficient is usually determined from unit cell analysis in the frequency domain, where the phase shift over the unit cell (progressive phase shift used to steer the beam) is applied as a boundary condition.It has been suggested that the name "scan reflection coefficient" is more appropriate than "active reflection coefficient",^[2] however the latter remains the most commonly used name.

Mathematical description

General case

The ARC for antenna element

in an array of

elements is calculated by:^[3]

\Gamma_S=

	N
\sum
	n=1

S_mn

	a_n
	a_m

where

a_n

are the excitation coefficients and

S_mn

are the coupling coefficients.

Linear array with specified scan angle

In a linear array with inter element spacing

, uniform amplitude tapering and scan angle

\theta₀

, the following excitation coefficients are used:

a_n=

	-jkna\sin\theta₀
e

. By inserting this expression into the general equation above, we obtain:^[4]

\Gamma_S(\theta₀₎=

	jkma\sin\theta₀
e

	N
\sum
	n=1

S_mn

	-jkna\sin\theta₀
e

Notes and References

Book: Mailloux . Robert J. . Phased array antenna handbook . 2005 . Boston: Artech House.
Book: Hansen . Robert C . Phased array antennas . John Wiley and Sons . Chapter 7.2.3. 2009.
Book: Hansen . Robert C . Phased array antennas . John Wiley and Sons . Chapter 7.2.3. 2009.
Pozar . D. M. . David M. Pozar . The active element pattern . IEEE Transactions on Antennas and Propagation . 1994 . 42 . 8 . 1176–1178. 10.1109/8.310010 . 1994ITAP...42.1176P .

Active reflection coefficient explained

Mathematical description

General case

Linear array with specified scan angle

See also

Notes and References