S-parameters can be converted to either T-parameters or ABCD-parameters, and both are considered a "transfer matrix". The conversion from S-parameters to T- or ABCD-parameters are defined differently, but they seem to be used similarly in the sense that matrix multiplcation can combine different S-parameter component matrixes by converting S->[T1][T2]->S or S->[ABCD1][ABCD2]->S.
T and ABCD parameters are used to chain, so for example you could compose matrixes in such a way that multiplying the matrix creates a parallel circuit. Thus, you could get a 10 nH inductor with two 20nH inductors if you have the S parameters for each converted to T / ABCD matrix (for example from a 0405DC-10N .S2P file from Coilcraft).
What I'm trying to understand is if a T-matrix and ABCD parameters are the same thing, or if they represent different ways of doing the same thing.
@LorenzoMarcantonio provides an appnote from MathWorks in an answer below that states:
The cascadesparams function uses ABCD-parameters. Alternatively, one can use S-parameters and ABCD-parameters (or T-parameters) to cascade S-parameters together by hand (assuming identical frequencies)
but the article doesn't get into the details about T vs ABCD.
This SE answer gets close, but still doesn't address T vs ABCD.
... so are they really the same or just similar?
Does \$T = \begin{pmatrix}A & B\\\ C & D\end{pmatrix}\$?, such that ABCD are really just the elements of the 2x2 T matrix, or is an ABCD matrix fundamentally different from a T-matrix?
If not, then what is the conceptual difference?
- When would you use T-parameters?
- When would you use ABCD-parameters?
