High-order Kirchhoff problems in bounded and unbounded domains

Abstract

Consider the following m-polyharmonic Kirchhoff problem: eqnarray ea cases M(∫|Dr u|m +a|u|m)[rm u +a|u|m-2u]= K(x)f(u) &in , \\ u=(∂∂ )k u=0, &on ∂, k=1, 2,..... , r-1, cases eqnarray where r ∈ *, m >1, N≥ rm+1, a≥ 0, K∈ L∞() is a positive weight function, M ∈ C([0,+∞)) and f∈ C(R) which will be specified later. We will study problem ea in the following different type of domains: enumerate a=0 and K∈ L∞() is a positive weight function if is a smooth bounded domain of N. a>0 and K∈ L∞() Lp(), p ≥ 1 if is an unbounded smooth domain. =N and a=0 (which called the mγ-zero mass case). enumerate We prove the existence of infinitely many solutions of ea for some odd functions f in u satisfying subcritical growth conditions at infinity which are weaker than the analogue of the Ambrosetti-Rabinowitz condition and the standard subcritical polynomial growth. The new aspect consists in employing the Schauder basis of W0r,m() to verify the geometry of the symmetric mountain pass theorem without any control on f near 0 if is a bounded domain and under a suitable condition at 0 if is a unbounded domain allowing only to derive the variational setting of ea. Moreover, we introduce a positive quantity λM similar to the first eigenvalue of the m-polyharmonic operator to find a mountain pass solution.