Can one hear the shape of a graph?

Distinguishing cospectral quantum graphs by scattering ⋮ Inverse nodal problems on quantum tree graphs ⋮ On equi-transmitting matrices ⋮ Finding the hole in a wall ⋮ Isospectrality for graph Laplacians under the change of coupling at graph vertices ⋮ Relativistic quantum chaos ⋮ Isospectral discrete and quantum graphs with the same flip counts and nodal counts ⋮ GSE spectra in uni-directional quantum systems ⋮ Locating a double vacancy or Stone-Wales point defect on a hexagonal quantum grid ⋮ A matrix Schrödinger approach to focusing nonlinear Schrödinger equations with nonvanishing boundary conditions ⋮ Concrete method for recovering the Euler characteristic of quantum graphs ⋮ Linear representations and isospectrality with boundary conditions ⋮ Symmetries of quantum graphs and the inverse scattering problem ⋮ ISOSPECTRALITY FOR GRAPH LAPLACIANS UNDER THE CHANGE OF COUPLING AT GRAPH VERTICES: NECESSARY AND SUFFICIENT CONDITIONS ⋮ Schrödinger operators on graphs and geometry. III. General vertex conditions and counterexamples ⋮ Scattering theory for the matrix Schrödinger operator on the half line with general boundary conditions ⋮ Inverse Sturm-Liouville problem for a star graph by three spectra ⋮ On the quotient quantum graph with respect to the regular representation ⋮ A formula for the spectra of differential operators on graphs ⋮ Recovering quantum graphs from their Bloch spectrum ⋮ On inverse topology problem for Laplace operators on graphs ⋮ The nodal count {0,1,2,3,…} implies the graph is a tree ⋮ Imaging geometric graphs using internal measurements ⋮ Hearing shapes viap-adic Laplacians ⋮ The number of eigenvalues of the matrix Schrödinger operator on the half line with general boundary conditions ⋮ New directions in real algebraic geometry. Abstracts from the workshop held March 19--24, 2023 ⋮ Cospectral quantum graphs with Dirichlet conditions at pendant vertices ⋮ Recovering the shape of a quantum graph ⋮ From the AKNS system to the matrix Schrödinger equation with vanishing potentials: Direct and inverse problems ⋮ A geometric construction of isospectral magnetic graphs ⋮ On recovering the shape of a quantum tree from the spectrum of the Dirichlet boundary problem ⋮ Some inverse scattering problems on star-shaped graphs ⋮ Quantum graphs: PT-symmetry and reflection symmetry of the spectrum ⋮ Aharonov-Bohm ring touching a quantum wire: how to model it and to solve the inverse problem ⋮ Can one hear the spanning trees of a quantum graph? ⋮ Discrete Multichannel Scattering with Step-like Potential ⋮ Resolvent expansions on hybrid manifolds ⋮ Spectral data characterization for the Sturm-Liouville operator on the star-shaped graph ⋮ \(n\)-Laplacians on metric graphs and almost periodic functions. I ⋮ Stable polynomials and crystalline measures ⋮ Direct and inverse multichannel scattering problems ⋮ Inverse problems for Aharonov–Bohm rings ⋮ High-energy analysis and Levinson's theorem for the selfadjoint matrix Schrödinger operator on the half line ⋮ Graph Laplacians and topology ⋮ Schrödinger operators on graphs and geometry I: Essentially bounded potentials ⋮ Green's function approach for quantum graphs: an overview ⋮ On the existence of point spectrum for branching strips quantum graph ⋮ Small-energy analysis for the selfadjoint matrix Schrödinger operator on the half line. II ⋮ Quasi-isospectrality on quantum graphs ⋮ Edge switching transformations of quantum graphs—a scattering approach ⋮ \(L^p-L^{p'}\) estimates for matrix Schrödinger equations ⋮ Schrödinger operators on graphs and geometry. II: Spectral estimates for \(L_1\)-potentials and an Ambartsumian theorem ⋮ An inverse problem for quantum trees with observations at interior vertices ⋮ On the decomposition of the Laplacian on metric graphs ⋮ Asymptotically isospectral quantum graphs and generalised trigonometric polynomials ⋮ Trace formulas for the matrix Schrödinger operator on the half-line with general boundary conditions ⋮ Quantum graphs via exercises ⋮ The \(L^p\) boundedness of the wave operators for matrix Schrödinger equations ⋮ Can one distinguish quantum trees from the boundary? ⋮ Small-energy analysis for the self-adjoint matrix Schrödinger operator on the half line ⋮ Wave and scattering operators for the nonlinear matrix Schrödinger equation on the half-line with a potential ⋮ Determining a distributed conductance parameter for a neuronal cable model defined on a tree graph ⋮ Effective numerical method of spectral analysis of quantum graphs