Table 4 Coupling setup. Here two networks are considered, the ones labelled Path 1 and Path 2 in Fig. 6

Path 1

\(S_1=300\ {\hbox {m}}^2\); \(L_{1,2}=2\) m; \(w_1=0.2\)

\(<v>_p=1\ {\hbox {m}}\,{\hbox {s}}^{-1}\); \(<v>_c=1.3\ {\hbox {m}}\,{\hbox {s}}^{-1}\)

\(\eta _{1,2}^p=0.4\); \(\eta _{1,2}^c=0.52\)

\(S_2=50\ m^2\); \(L_{2,3}=2\) m; \(w_2=0.2\)

\(<v>_p=0.5\ {\hbox {m}}\,{\hbox {s}}^{-1}\); \(<v>_c=0.65\ {\hbox {m}}\,{\hbox {s}}^{-1}\)

\(\eta _{2,3}^p=1.2\); \(\eta _{2,3}^c=1.62\)

Path 2

\(S_1=1200\ {\hbox {m}}^2\); \(L_{1,2}=30\) m; \(w_1=0.2\)

\(<v>_p=1\ {\hbox {m}}\,{\hbox {s}}^{-1}\); \(<v>_c=1.3\ {\hbox {m}}\,{\hbox {s}}^{-1}\)

\(\eta _{1,2}^p=1.5\); \(\eta _{1,2}^c=1.95\)

\(S_2=300\ {\hbox {m}}^2\); \(L_{2,3}=30\) m; \(w_2=0.2\)

\(<v>_p=0.5\ {\hbox {m}}\,{\hbox {s}}^{-1}\); \(<v>_c=0.65\ {\hbox {m}}\,{\hbox {s}}^{-1}\)

\(\eta _{2,3}^p=3\); \(\eta _{2,3}^c=3.9\)