I'm trying to understand the operation of an ideal RF power combiner.
Below is the scattering matrix of such device. (i.e. Wilkinson Power Divider)
\$[S] = {\frac {-j}{\sqrt {2}}}{\begin{bmatrix} 0 & 1 & 1 \\1 & 0 & 0 \\ 1 & 0 & 0\end{bmatrix}}\$
I know how the division works but I'm confused as to how power combination works.
If we were to send a wave from port 2 with an amplitude of A, and in same phase a wave with amplitude of B from port 3 we should get A+B in port 1 since the waves can't go anywhere else in the device.
But i fail to explain this with scattering parameters. \$[b] = [S].[a]\$
In our case \$ [a] = {\begin{bmatrix} 0 \\A \\ B \end{bmatrix}}\$
If we do the matrix scalar multiplication we get:
\$ [b] = {\begin{bmatrix} {\frac {-j}{\sqrt {2}} (A+B)} \\0 \\ 0 \end{bmatrix}}\$
So we got \$ \frac {-j}{\sqrt {2}}(A+B) \$ at port 1 instead of \$ (A+B)\$.
Where did the rest go? Same thing goes for magic tee as well. Thank you for your time.
1/sqrt(2)*(A + B)is correct. IfA = B, you'll have2/sqrt(2)*Awhich is twice the power ofA. It didn't go anywhere. \$\endgroup\$Ato both port 2 and 3, port 1 will be1/sqrt(2)*(A + B)=2A/sqrt(2)which is still twice the power of A. \$\endgroup\$|2*A/sqrt(2)|^2 = 2A^2which is TWICE the power of A. If the answer were2Athen|2*A|^2 = 4A^2which is 4x the power of A. \$\endgroup\$