On the weighted logarithmic potential operator

Abstract

For a bounded open set ⊂ RN with N≥ 2, and for positive continuous functions w,g on , we consider the weighted eigenvalue problem equation* Lw u =τ gu, equation* where Lw is the weighted logarithmic potential operator on L2() as defined below: equation* Lw u(x)=∫ (w(x)w(y)|x-y|)u(y)dy. equation* We study the monotonicity and continuity of the largest positive eigenvalue τw,g+() with respect to , w, and g. We also establish that τw,g+() satisfies a reverse Faber Krahn inequality under polarization. We provide a sufficient condition for the existence of a negative eigenvalue in terms of the weighted transfinite diameter of , under the assumption that w is superharmonic. For ⊂ R2, if w is a constant C, we show that 0 can be an eigenvalue of Lw only when C=2π||. For such domains, if w is a harmonic function on , we provide a representation formula for the eigenfunctions. Using this representation, we establish variants of the maximum principles that give some insight into the geometry of these eigenfunctions.