.. _circuit:: | | Download This Notebook: :download:Circuit.ipynb

# Circuits¶

## Introduction¶

The Circuit class represents a circuit of arbitrary topology, consisting of an arbitrary number of N-ports Networks connected together. Like in an electronic circuit simulator, the circuit must have one (or more) Port connected to the circuit. The Circuit object allows one retrieving the M-ports Network (and thus its network parameters: $$S$$, $$Z$$, etc.), where M is the number of ports defined. Moreover, the Circuit object also allows calculating the scattering matrix $$S$$ of the entire circuit, that is the “internal” scattering matrices for the various intersections in the circuit. The calculation algorithm is based on ref [1].

The figure below illustrates a network with 2 ports, Network elements $$N_i$$ and intersections:

one must must define the connection list (“netlist”) of the circuit. This connexion list is defined as a List of List of interconnected Tuples (network, port_number):

connexions = [
[(network1, network1_port_nb), (network2, network2_port_nb), (network2, network2_port_nb), ...],
...
]


For example, the connexion list to construct the above circuit could be:

connexions = [
[(port1, 0), (network1, 0), (network4, 0)],
[(network1, 1), (network2, 0), (network5, 0)],
[(network1, 2), (network3, 0)],
[(network2, 1), (network3, 1)],
[(network2, 2), (port2, 0)],
[(network5, 1), (ground1, 0)]
]


where we have assumed that port1, port2, ground1 and all the network1 to network5 are scikit-rf Networks objects with same Frequency. Networks can have different (real) characteristic impedances: mismatch are taken into account. Convenience methods are provided to create ports and grounded connexions: the Circuit.Port() and Circuit.Ground() methods. Note that the port 1 of the network4 is left open, so is not described in the connexion list.

Once the connexion list is defined, the Circuit with:

resulting_circuit = rf.Circuit(connexions)


resulting_circuit is a Circuit object.

The resulting 2-ports Network is obtained with the Circuit.network parameter:

resulting_network = resulting_circuit.network


Note that it is also possible to create manually a circuit of multiple Network objects using the connecting methods of scikit-rf. Although the Circuit approach to build a multiple Network may appear to be more verbose than the ‘classic’ way for building a circuit, as the circuit complexity increases, in particular when components are connected in parallel, the Circuit approach is interesting as it increases the readability of the code. Moreover, Circuit circuit topology can be plotted using its plot_graph method, which is usefull to rapidly control if the circuit is built as expected.

[1] Hallbjörner, P., 2003. Method for calculating the scattering matrix of arbitrary microwave networks giving both internal and external scattering. Microw. Opt. Technol. Lett. 38, 99–102. https://doi.org/10/d27t7m

## Examples¶

Assume that a $$50\Omega$$ lossless transmission line is loaded with a $$Z_L=75\Omega$$ impedance.

If the transmission line electric length is $$\theta=0$$, then one would thus expect the reflection coefficient to be:

$\rho = s = \frac{Z_L - Z_0}{Z_L + Z_0} = 0.2$
[1]:

import skrf as rf
rf.stylely()

[2]:

Z_0 = 50
Z_L = 75
theta = 0

# the necessary Frequency description
freq = rf.Frequency(start=1, stop=2, unit='GHz', npoints=3)

# The combination of a transmission line + a load can be created
# using the convenience delay_load method
# important: all the Network must have the parameter "name" defined
tline_media = rf.DefinedGammaZ0(freq, z0=Z_0)

# the input port of the circuit is defined with the Circuit.Port method
# In order for Circuit() to recognize the Network as a "port", its name must contains the word 'port':
port1 = rf.Circuit.Port(freq, 'port1', z0=Z_0)

# connexion list
cnx = [
]
# building the circuit
cir = rf.Circuit(cnx)

# getting the resulting Network from the 'network' parameter:
ntw = cir.network
print(ntw)

1-Port Network: '',  1.0-2.0 GHz, 3 pts, z0=[50.+0.j]

[3]:

# as expected the reflection coefficient is:
print(ntw.s[0])

[[0.2+0.j]]


It is also possible to build the above circuit using a series impedance Network, then shorted:

To do so, one would need to use the Ground() method to generate the required Network object.

[4]:

port1 = rf.Circuit.Port(freq, 'port1', z0=Z_0)
# piece of transmission line and series impedance
trans_line = tline_media.line(theta, unit='deg', name='trans_line')
# ground network (short)
ground = rf.Circuit.Ground(freq, name='ground')

# connexion list
cnx = [
[(port1, 0), (trans_line, 0)],
]
# building the circuit
cir = rf.Circuit(cnx)
# the result if the same :
print(cir.network.s[0])


[[0.2+0.j]]


### LC Filter¶

Here we model a low-pass LC filter, with example values taken from rf-tools.com :

[5]:

freq = rf.Frequency(start=0.1, stop=10, unit='GHz', npoints=1001)
tl_media = rf.DefinedGammaZ0(freq, z0=50, gamma=1j*freq.w/rf.c)
C1 = tl_media.capacitor(3.222e-12, name='C1')
C2 = tl_media.capacitor(82.25e-15, name='C2')
C3 = tl_media.capacitor(3.222e-12, name='C3')
L2 = tl_media.inductor(8.893e-9, name='L2')
RL = tl_media.resistor(50, name='RL')
gnd = rf.Circuit.Ground(freq, name='gnd')
port1 = rf.Circuit.Port(freq, name='port1', z0=50)
port2 = rf.Circuit.Port(freq, name='port2', z0=50)

cnx = [
[(port1, 0), (C1, 0), (L2, 0), (C2, 0)],
[(L2, 1), (C2, 1), (C3, 0), (port2, 0)],
[(gnd, 0), (C1, 1), (C3, 1)],
]
cir = rf.Circuit(cnx)
ntw = cir.network

[6]:

ntw.plot_s_db(m=0, n=0, lw=2, logx=True)
ntw.plot_s_db(m=1, n=0, lw=2, logx=True)


When building a Circuit made of few networks, it can be usefull to represent the connexion graphically, in order to check for possible errors. This is possible using the Circuit.plot_graph() method. Ports are indicated by triangles, Network with squares and interconnections with circles. It is possible to display the network names as well as their associated ports (and characteristic impedances):

[7]:

cir.plot_graph(network_labels=True, network_fontsize=15,
port_labels=True, port_fontsize=15,
edge_labels=True, edge_fontsize=10)

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