On a -Kirchhoff equation via Krasnoselskii’s genus

## Paper 1. Introduction We are concerned with the following p.x/-Kirchhoff type equation where R N is a bounded smooth domain, p 2 C with 1 < p .x/ < N. We assume that M and f satisfy the following conditions: .M 1 / M : R C ! R C is a continuous function and satisfies the (polynomial growth) c

We prove a global existence result in suitable Sobolev spaces for the solution of the nonlinear Cauchy problem where n > 3 is the space dimension, the initial data are C ∞ with compact support in R n , and K z is a positive smooth function rapidly decreasing as z → ∞. Our approach is based on the e

We consider Kirchhoff's equation with a nonlinear damping coefficient depending on the displacement. The equation is proven to generate a dissipative semigroup possessing both compact global and exponential attractors.

Kirchhoff's integral equation describes the transient phenomena of electromagnetic fields. This impfies that one can simulate the transient electromagnetic fields using the boundary element method (BEM) based on KirchhoWs integral equation. So called 'wake-fields', which are the transient electroma