On Eigenvalues of Logarithmic Potential Operator in the Hyperbolic Space

Abstract

Let be a bounded open set in the Poincar\'e hyperbolic disk, D. In this article, we consider the hyperbolic logarithmic potential operator Lh : L2() L2(), defined by equation* Lh u(z)=12∫ 1[z,w]\,u(w)\, \, d(w), equation* and the associated eigenvalue problem on equation Lh u=τ u. equation We first extend the notion of polarization with respect to hyperplanes in the Poincar\'e disk and prove the associated properties. Then we establish a reverse Faber-Krahn inequality for the largest eigenvalue, τh of Lh, under polarization. Further, we provide a representation formula for the eigenfunctions of Lh. In addition, we show that the operator Lh is a positive operator on L2().