https://orcid.org/0000-0001-7403-3444
References
- Vougalter V, Volpert V. Solvability of some integro-differential equations with anomalous diffusion. In: Volchenkov D, Leoncini X, editors. Regularity and stochasticity of nonlinear dynamical systems. Cham: Springer; 2018. p. 1–17. (Nonlinear Syst. Complex.; 21).
- Coombes S, Beim Graben P, Potthast R, et al., editors. Neural fields: theory and applications. Berlin: Springer; 2014.
- Amrouche C, Girault V, Giroire J. Dirichlet and Neumann exterior problems for the n-dimensional Laplace operator: an approach in weighted Sobolev spaces. J Math Pures Appl. 1997;76(1):55–81.
- Amrouche C, Bonzom F. Mixed exterior Laplace's problem. J Math Anal Appl. 2008;338:124–140.
- Bolley P, Pham TL. Propriété d'indice en théorie Hölderienne pour des opérateurs différentiels elliptiques dans Rn. J Math Pures Appl. 1993;72(1):105–119.
- Bolley P, Pham TL. Propriété d'indice en théorie Hölderienne pour le problème extérieur de Dirichlet. Commun Partial Differ Equ. 2001;26(1–2):315–334.
- Benkirane N. Propriété d'indice en théorie Hölderienne pour des opérateurs elliptiques dans Rn. CRAS. 1988;307(Série I):577–580.
- Efendiev M, Vougalter V. Solvability in the sense of sequences for some fourth order non-Fredholm operators. J Differ Equ. 2021;271(1):280–300.
- Volpert V. Elliptic partial differential equations: volume 1. Fredholm theory of elliptic problems in unbounded domains. Monographs in Mathematics, 101. Birkhauser/Springer Basel AG, Basel; 2011. 639 pp.
- Vougalter V, Volpert V. On the solvability conditions for some non Fredholm operators. Int J Pure Appl Math. 2010;60(2):169–191.
- Vougalter V, Volpert V. Solvability conditions for some non-Fredholm operators. Proc Edinb Math Soc (2). 2011;54(1):249–271.
- Efendiev M. Fredholm structures, topological invariants and applications. Springfield, MO: American Institute of Mathematical Sciences (AIMS); 2009. p. 205. (Fredholm structures, topological invariants and applications; vol. 3).
- Vougalter V, Volpert V. On the solvability conditions for the diffusion equation with convection terms. Commun Pure Appl Anal. 2012;11(1):365–373.
- Volpert V, Vougalter V. On the solvability conditions for a linearized Cahn–Hilliard equation. Rend Istit Mat Univ Trieste. 2011;43:1–9.
- Vougalter V, Volpert V. Solvability conditions for a linearized Cahn–Hilliard equation of sixth order. Math Model Nat Phenom. 2012;7(2):146–154.
- Vougalter V, Volpert V. On the existence of stationary solutions for some non-Fredholm integro-differential equations. Doc Math. 2011;16:561–580.
- Vougalter V, Volpert V. Solvability conditions for some linear and nonlinear non-Fredholm elliptic problems. Anal Math Phys. 2012;2(4):473–496.
- Ducrot A, Marion M, Volpert V. Systemes de réaction-diffusion sans propriété de Fredholm. CRAS. 2005;340:659–664.
- Ducrot A, Marion M, Volpert V. Reaction-diffusion problems with non Fredholm operators. Adv Differ Equ. 2008;13(11–12):1151–1192.
- Alfimov GL, Medvedeva EV, Pelinovsky DE. Wave systems with an infinite number of localized traveling waves. Phys Rev Lett. 2014;112:054103.
- Alfimov GL, Korobeinikov AS, Lustri CJ, et al. Standing lattice solitons in the discrete NLS equation with saturation. Nonlinearity. 2019;32(9):3445–3484.
- Adami R, Noja D. Exactly solvable models and bifurcations: the case of the cubic NLS with a δ or a δ′ interaction in dimension one. Math Model Nat Phenom. 2014;9(5):1–16.
- Fukuizumi R, Jeanjean L. Stability of standing waves for a nonlinear Schrödinger equation with a repulsive Dirac delta potential. Discrete Contin Dyn Syst. 2008;21(1):121–136.
- Holmer J, Marzuola J, Zworski M. Fast soliton scattering by delta impurities. Commun Math Phys. 2007;274(1):187–216.
- Lieb E, Loss M. Analysis. Providence: American Mathematical Society; 1997. (Graduate studies in mathematics; 14).
- Vougalter V. On threshold eigenvalues and resonances for the linearized NLS equation. Math Model Nat Phenom. 2010;5(4):448–469.
- Cuccagna S, Pelinovsky D, Vougalter V. Spectra of positive and negative energies in the linearized NLS problem. Commun Pure Appl Math. 2005;58(1):1–29.