A solution of nonlinear Schrodinger equation ¨ on metric graphs
Annotation
We treat the Nonlinear Schrodinger equation (NLSE) on Metric graph. An approach developed earlier for ¨ NLSE on interval [14], is extended for star graph. Dirichlet boundary conditions are imposed at the ends of bonds are imposed, while continuity conditions are chosen at the vertex of graph.
Keywords
Постоянный URL
Articles in current issue
- Time-dependent quantum graph
- An introduction to the spectral asymptotics of a damped wave equation on metric graphs
- The relativistic inverse scattering problem for quantum graphs
- Cauchy problem for the linearized KdV equation on general metric star graphs
- Uncertainty relation between angle and orbital angular momentum: interference effect in electron vortex beams
- Perturbative hydrodynamic Gross–Pitaevskii treatment for Bose–Einstein condensate in infinite length ring with disorder
- Quantum dynamics in a kicked square billiards
- Time-dependent quantum circular billiard
- Femtosecond pulse shaping via engineered nonlinear photonic crystals
- Nanocatalysis: hypothesis on the action mechanism of gold
- Particle dynamics in corrugated rectangular billiard
- Inverse problem for the identification of a memory kernel from Maxwell’s system integro – differential equations for a homogeneous anisotropic media
- Renyi entropy for the doped graphene at low temperatures
- Universality of the discrete spectrum asymptotics of the three-particle Schrodinger operator on a lattice
- Dependence of the dimension of the associates of water-soluble tris-malonate of light fullerene — C60 [= C(COOH)2]3 in water solutions at 25 ◦C