The Third International Conference: Nonlinear Waves--Theory and Applications

MINISYMPOSIA

Localized Excitations in Nonlocal PDEs

Organizers:

Vassilis M Rothos (Aristotle University of Thessaloniki, Greece )

The evolution equations can be used to illustrate many striking features of nonlinear waves, each of which has been understood by a combination of methods from scientific computations and from the theory of PDEs and geometric dynamical systems. The minisymposium will bring together specialists in the nonlinear nonlocal evolution equations. Recent results were obtained in the context of localized modes of nonlocal lattice equations, stability of vortices in nonlocal Nonlinear Schrödinger (NLS) equations with an external potential, embeded solitons in nonlocal PDEs and nonlocal water waves equations. Speakers of the minisymposium will bring the latest development in these and other problems.

List of Speakers:

1) G.L.Alfimov ( National Research University of Electronic Technology, Moscow, Russia )

"Discrete spectrum of nonlinear modes in weakly nonlocal problems: a mechanism to emerge"

2) Chris Curtis ( University of Colorado Boulder, U. S. A. )

"Stability of Solutions to a Non-local Gross-Pitaevskii Equation"

3) Olga Trichtchenko ( University of Washington, U. S. A. )

"Stability of water waves in the presence of surface tension"

4) D. A. Zezyulin ( University of Lisbon, Portugal )

"Localized modes in nonlocal nonlinear Schrödinger equation with PT -symmetric parabolic potential"

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