Affine isoperimetric inequalities for the first eigenvalue of the m-th order Affine p-Laplace Operator

Abstract

Recently, Haddad, Jim\'enez, and Montenegro introduced the affine p-Laplace operator, p>1, and studied associated affine versions of the isoperimetric inequalities for the first eigenvalue of the affine p-Laplace operator, including the affine Faber-Krahn inequality and affine Talenti inequality. In this work, we introduce the mth-order p-Laplace operator Q,pA f, which recovers the affine p-Laplace operator when m=1 and Q is a symmetric interval. Given n,m ∈ N, a sufficiently smooth convex body Q ⊂ Rm, a bounded, open set ⊂ Rn and p >1, we investigate the eigenvalue problem \[cases Q,pA f = λ1,pA(Q,) |f|p-2 f & in ; \\ f=0 & on ∂ , cases \] for f ∈ W1,p0(). Finally, we establish mth-order extensions of the affine Talenti inequality and affine Faber-Krahn inequality, which, upon choosing m=1, yield new, asymmetric versions of those aforementioned inequalities.

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