Existence of sign-changing solutions for the nonlinear p-Laplacian boundary value problem
Abstract
We study the nonlinear one-dimensional p-Laplacian equation -(y'(p-1))'+(p-1)q(x)y(p-1)=(p-1)w(x)f(y) on (0,1), with linear separated boundary conditions. We give sufficient conditions for the existence of solutions with prescribed nodal properties concerning the behavior of f(s)/s(p-1) when s are at infinity and zero. These results are more general and complementary for previous known ones for the case p=2 and q is nonnegative.
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