Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Computational Mathematics,Numerical Analysis,Analysis
Reference27 articles.
1. Adami, R., Noja, D.: Stability and symmetry-breaking bifurcation for the ground states of a NLS with a $$\delta ^{\prime }$$ interaction. Commun. Math. Phys. 318(1), 247–289 (2013)
2. Adami, R., Noja, D.: Exactly solvable models and bifurcations: the case of the cubic NLS with a $$\delta $$ or a $$\delta ^{\prime }$$ interaction in dimension one. Math. Model. Nat. Phenom. 9(5), 1–16 (2014)
3. Angulo Pava, J., Goloshchapova, N.: Extension theory approach in the stability of the standing waves for the NLS equation with point interactions on a star graph. Adv. Differ. Equ. 23(11–12), 793–846 (2018)
4. Angulo Pava, J., Goloshchapova, N.: Stability properties of standing waves for NLS equations with the $$\delta ^{\prime }$$-interaction. Phys. D 403, 132332 (2020)
5. Atkinson, F.V.: Discrete and Continuous Boundary Problems, Mathematics in Science and Engineering, vol. 8. Academic Press, New York (1964)