Existence results for variational quasilinear elliptic systems involving the vectorial p-Laplacian
Abstract
We prove existence and regularity results for the following elliptic system: \[ cases -div(|Du|p-2Du)=f(x,u) & in \\ u=0 & on ∂, cases \] where u=(u1,…,um), p>1, and ⊂RN is a bounded domain. We also consider the special case \[f(x,u)=λ|u|p-2u+|u|q-2u,\] and we prove a classification result. In particular, we show that any least energy solution is of the form (c1ω,…,cmω), where c=(c1,…,cm)∈ Sm-1 (the (m-1)-sphere in Rm) and ω is a positive solution of the corresponding scalar equation.
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