Add to ORKGNot necessarily self-adjoint quantum graphs – differential operators on metric graphs – are considered. Assume in addition that the underlying metric graph possesses an automorphism (symmetry) $ \mathcal P $. If the differential operator is $ \mathcal P \mathcal T$-symmetric, then its spectrum has reflection symmetrywith respect to the real line. Our goal is to understand whether the opposite statement holds, namely whether the reflection symmetry of the spectrum ofa quantum graph implies that the underlying metric graph possesses a non-trivial automorphism and the differential operator is $ \mathcal P \mathcal T$-symmetric.We give partial answer to this question by considering equilateral star-graphs. The corresponding Laplace operator wit...
AbstractThe Schrödinger equation on a graph together with a set of self-adjoint boundary conditions ...
We investigate the bottom of the spectra of infinite quantum graphs, i.e., Laplace operators on metr...
This thesis is devoted to inverse spectral problems for Laplace operators on metric graphs, and it i...
Not necessarily self-adjoint quantum graphs – differential operators on metric graphs – are consider...
In the current article it is analyzed how ideas of PT-symmetricquantum mechanics can be applied to q...
How ideas of PT-symmetric quantum mechanics can be applied to quantum graphs is analyzed, in particu...
We introduce the theory of quantum symmetry of a graph by starting with quantum permutation groups a...
This thesis consists of four papers and deals with the spectral theory of quantum graphs. A quantum ...
This thesis consists of four papers and deals with the spectral theory of quantum graphs. A quantum ...
This thesis consists of four papers and deals with the spectral theory of quantum graphs. A quantum ...
The inverse spectral problem for the Laplace operator on a finite metric graph is investigated. It i...
A quantum graph is a weighted combinatorial graph equipped with a Hamiltonian operator acting on fun...
Differential operators on metric graphs are investigated. It is proven that vertex matching (boundar...
A quantum graph is a weighted combinatorial graph equipped with a Hamiltonian operator acting on fun...
A quantum graph is a weighted combinatorial graph equipped with a Hamiltonian operator acting on fun...
AbstractThe Schrödinger equation on a graph together with a set of self-adjoint boundary conditions ...
We investigate the bottom of the spectra of infinite quantum graphs, i.e., Laplace operators on metr...
This thesis is devoted to inverse spectral problems for Laplace operators on metric graphs, and it i...
Not necessarily self-adjoint quantum graphs – differential operators on metric graphs – are consider...
In the current article it is analyzed how ideas of PT-symmetricquantum mechanics can be applied to q...
How ideas of PT-symmetric quantum mechanics can be applied to quantum graphs is analyzed, in particu...
We introduce the theory of quantum symmetry of a graph by starting with quantum permutation groups a...
This thesis consists of four papers and deals with the spectral theory of quantum graphs. A quantum ...
This thesis consists of four papers and deals with the spectral theory of quantum graphs. A quantum ...
This thesis consists of four papers and deals with the spectral theory of quantum graphs. A quantum ...
The inverse spectral problem for the Laplace operator on a finite metric graph is investigated. It i...
A quantum graph is a weighted combinatorial graph equipped with a Hamiltonian operator acting on fun...
Differential operators on metric graphs are investigated. It is proven that vertex matching (boundar...
A quantum graph is a weighted combinatorial graph equipped with a Hamiltonian operator acting on fun...
A quantum graph is a weighted combinatorial graph equipped with a Hamiltonian operator acting on fun...
AbstractThe Schrödinger equation on a graph together with a set of self-adjoint boundary conditions ...
We investigate the bottom of the spectra of infinite quantum graphs, i.e., Laplace operators on metr...
This thesis is devoted to inverse spectral problems for Laplace operators on metric graphs, and it i...