The Dirichlet eigenvalue problems for some concave elliptic Hessian operators

Abstract

In this manuscript, we investigate a priori estimates for the solution to the Dirichlet eigenvalue problem for a broad class of concave elliptic Hessian operators of the form \[ F(D2u)=- u in \, , u=0 on \, ∂ . \] These operators encompass the Monge-Amp\`ere operator, the k-Hessian operators, and the p-Monge-Amp\`ere operators. We impose a fairly mild constraint on the operator F, allowing us to demonstrate the existence of the first nonzero eigenvalue and its corresponding -admissible eigenfunction on the smooth, strictly -convex domain ⊂ Rn. Furthermore, we prove that the eigenfunction u1 belongs to C∞() C1,1(). As an application, we prove that every invariant Garding-Dirichlet operator admits a unique first nonzero eigenvalue. Finally, a bifurcation-type theory for these operators is also established.

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