Blow-up solutions for some nonlinear elliptic equations involving a Finsler-Laplacian

Abstract

In this paper we prove existence results and asymptotic behavior for strong solutions u∈ W2,2loc() of the nonlinear elliptic problem equation P abstr \ arrayll -Hu+H(∇ u)q+λ u=f&in ,\\ u→ +∞ &on ∂, array . equation where H is a suitable norm of Rn, is a bounded domain, H is the Finsler Laplacian, 1<q 2, λ>0 and f is a suitable function in L∞loc. Furthermore, we are interested in the behavior of the solutions when λ→ 0+, studying the so-called ergodic problem associated to abstr. A key role in order to study the ergodic problem will be played by local gradient estimates for abstr.