@misc{10481/63121,
year = {2012},
url = {http://hdl.handle.net/10481/63121},
abstract = {In this paper, by using Leray-Schauder degree arguments and critical point
theory for convex, lower semicontinuous perturbations of C1-functionals,
we obtain existence of classical positive radial solutions for Dirichlet problems of type
div ( √1 − |∇ ∇v v|2 ) + f(|x|; v) = 0 in B(R); v = 0 on @B(R):
Here, B(R) = {x ∈ RN : |x| < R} and f : [0; R] × [0; α) → R is a
continuous function, which is positive on (0; R] × (0; α):},
organization = {GENIL (Spain) 	
YTR-2011-7},
organization = {Ministerio de Economia y Competitividad, Spain 	
MTM2011-23652},
organization = {PN-II-RU-TE-2011-3-0157},
publisher = {Elsevier},
keywords = {Dirichlet problem},
keywords = {Positive radial solutions},
keywords = {Mean curvature operator},
keywords = {Minkowski space},
keywords = {Leray-Schauder degree},
keywords = {Szulkin’s critical point theory},
title = {Positive radial solutions for Dirichlet problems with mean curvature operators in Minkowski space},
doi = {10.1016/j.jfa.2012.10.010},
author = {Bereanu, C. and Jebelean, P. and Torres Villarroya, Pedro José},
}