Pairs of nodal solutions for a Minkowski-curvature boundary value problem in a ball
Abstract
By using a shooting technique, we prove that the quasilinear boundary value problem div \, ( ∇ u1-| ∇ u |2) + λ q(| x |) | u |p-1 u = 0, u|∂ B = 0, where B ⊂ RN is a ball and p > 1, has more and more pairs of nodal solutions on growing of the parameter λ > 0. The radial Neumann problem and the periodic problem for the corresponding one-dimensional equation are considered, as well.
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