AbstractWe identify and investigate isoscattering strings of concatenating quantum graphs possessing n units and 2n infinite external leads. We give an insight into the principles of designing large graphs and networks for which the isoscattering properties are preserved for $$n \rightarrow \infty $$
n
→
∞
. The theoretical predictions are confirmed experimentally using $$n=2$$
n
=
2
units, four-leads microwave networks. In an experimental and mathematical approach our work goes beyond prior results by demonstrating that using a trace function one can address the unsettled until now problem of whether scattering properties of open complex graphs and networks with many external leads are uniquely connected to their shapes. The application of the trace function reduces the number of required entries to the $$2n \times 2n $$
2
n
×
2
n
scattering matrices $${\hat{S}}$$
S
^
of the systems to 2n diagonal elements, while the old measures of isoscattering require all $$(2n)^2$$
(
2
n
)
2
entries. The studied problem generalizes a famous question of Mark Kac “Can one hear the shape of a drum?”, originally posed in the case of isospectral dissipationless systems, to the case of infinite strings of open graphs and networks.
Fundamental length in quantum theories withPT-symmetric Hamiltonians. II. The case of quantum graphs
