The numbers of nontrivial solutions to p-Laplacian impulsive equations
with nonhomogeneous Neumann boundary conditions
AbstractThe sufficient condition of the existence of solutions to some
superlinear p-Laplacian impulsive differential equations with
nonhomogeneous Neumann boundary conditions is obtained. We get two
theorems via variational methods and corresponding critical-points
theorems. To reveal the value of obtained theorems, two examples are
presented combining with the Newton-iterative method.