AbstractA notion of splines is introduced on a quantum graph Γ. It is shown that eigen values of a Hamiltonian on a finite graph Γ can be determined as limits of eigenvalues of certain finite-dimensional operators in spaces of polynomial splines on Γ. In particular, a bounded set of eigenvalues can be determined using a space of such polynomial splines with a fixed set of singularities. It is also shown that corresponding eigenfunctions can be reconstructed as uniform limits of the same polynomial splines with appropriate fixed set of singularities
We prove a quantum-ergodicity theorem on large graphs, for eigenfunctions of Schrödinger operators i...
Let G be a metric non-compact connected graph with finitely many edges. The main object of the paper...
This thesis consists of four papers and deals with the spectral theory of quantum graphs. A quantum ...
Abstract. We study the first eigenvalue of the p−Laplacian (with 1 < p < ∞) on a quantum graph...
A quantum graph is a weighted combinatorial graph equipped with a Hamiltonian operator acting on fun...
Abstract: Let G be a metric, finite, noncompact, and connected graph with finitely many edges and ve...
This thesis consists of four papers concerning topics in the spectral theory of quantum graphs, whic...
We study the first eigenvalue of the p- Laplacian (with 1 < p< ∞) on a quantum graph with Dirichlet ...
AbstractA notion of band-limited functions is introduced in terms of a Hamiltonian on a quantum grap...
We investigate the properties of the zeros of the eigenfunctions on quantum graphs (metric graphs wi...
Presented at the QMath13 Conference: Mathematical Results in Quantum Theory, October 8-11, 2016 at t...
The eigenvalue problem for linear differential operators is important since eigenvalues correspond t...
AbstractA new concept of a removable set of vertices on a combinatorial graph is introduced. It is s...
Abstract: We investigate statistical properties of the eigenfunctions of the Schrödinger operator o...
Consider a sequence of finite regular graphs converging, in the sense of Benjamini-Schramm, to the i...
We prove a quantum-ergodicity theorem on large graphs, for eigenfunctions of Schrödinger operators i...
Let G be a metric non-compact connected graph with finitely many edges. The main object of the paper...
This thesis consists of four papers and deals with the spectral theory of quantum graphs. A quantum ...
Abstract. We study the first eigenvalue of the p−Laplacian (with 1 < p < ∞) on a quantum graph...
A quantum graph is a weighted combinatorial graph equipped with a Hamiltonian operator acting on fun...
Abstract: Let G be a metric, finite, noncompact, and connected graph with finitely many edges and ve...
This thesis consists of four papers concerning topics in the spectral theory of quantum graphs, whic...
We study the first eigenvalue of the p- Laplacian (with 1 < p< ∞) on a quantum graph with Dirichlet ...
AbstractA notion of band-limited functions is introduced in terms of a Hamiltonian on a quantum grap...
We investigate the properties of the zeros of the eigenfunctions on quantum graphs (metric graphs wi...
Presented at the QMath13 Conference: Mathematical Results in Quantum Theory, October 8-11, 2016 at t...
The eigenvalue problem for linear differential operators is important since eigenvalues correspond t...
AbstractA new concept of a removable set of vertices on a combinatorial graph is introduced. It is s...
Abstract: We investigate statistical properties of the eigenfunctions of the Schrödinger operator o...
Consider a sequence of finite regular graphs converging, in the sense of Benjamini-Schramm, to the i...
We prove a quantum-ergodicity theorem on large graphs, for eigenfunctions of Schrödinger operators i...
Let G be a metric non-compact connected graph with finitely many edges. The main object of the paper...
This thesis consists of four papers and deals with the spectral theory of quantum graphs. A quantum ...