| dc.creator | Dávila Bonczos, Juan | |
| dc.creator | Pino Manresa, Manuel del | |
| dc.creator | Wei, Juncheng | |
| dc.date.accessioned | 2014-01-27T13:34:10Z | |
| dc.date.available | 2014-01-27T13:34:10Z | |
| dc.date.created | 2014-01-27T13:34:10Z | |
| dc.date.issued | 2014-01-15 | |
| dc.identifier | Journal of Differential Equations
Volume 256, Issue 2, 15 January 2014, Pages 858–892 | |
| dc.identifier | doi: 10.1016/j.jde.2013.10.006 | |
| dc.identifier | https://repositorio.uchile.cl/handle/2250/126285 | |
| dc.description.abstract | We consider the semilinear equation
epsilon(2s)(-Delta)(s)u + V(x)u - u(p) = 0, u > 0, u is an element of H-2s(R-N)
where 0 < s < 1, 1 < p < N+2s/N-2s, V (x) is a sufficiently smooth potential with inf(R) V(x) > 0, and epsilon > 0 is a small number. Letting w(lambda) be the radial ground state of (-Delta)(s) w(lambda) + lambda w(lambda) - w(lambda)(p) = 0 in H-2s (R-N), we build solutions of the form
u epsilon(x) similar to (k)Sigma(i=1)w lambda(i)((x - xi(epsilon)(i))/epsilon),
where lambda(i) = V(xi(epsilon)(i)) and the xi(epsilon)(i) approach suitable critical points of V. Via a Lyapunov-Schmidt variational reduction, we recover various existence results already known for the case s = 1. In particular such a solution exists around k nondegenerate critical points of V. For s = 1 this corresponds to the classical results by Floer and Weinstein [13] and Oh [24,25]. (C) 2013 Elsevier Inc. All rights reserved. | |
| dc.language | en_US | |
| dc.publisher | Elsevier | |
| dc.rights | http://creativecommons.org/licenses/by-nc-nd/3.0/cl/ | |
| dc.rights | Attribution-NonCommercial-NoDerivs 3.0 Chile | |
| dc.title | Concentrating standing waves for the fractional nonlinear Schrodinger equation | |
| dc.type | Artículo de revista | |
