On the weighted logarithmic potential operator
Abstract
For a bounded open set with , and for positive continuous functions on , we consider the weighted eigenvalue problem \begin{equation*} \mathcal{L}_{w} u =\tau gu, \end{equation*} where is the weighted logarithmic potential operator on as defined below: \begin{equation*} \mathcal{L}_{w} u(x)=\int_\Omega \log\left(\frac{w(x)w(y)}{|x-y|}\right)u(y)dy. \end{equation*} We study the monotonicity and continuity of the largest positive eigenvalue with respect to , , and . We also establish that 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 is superharmonic. For , if is a constant , we show that 0 can be an eigenvalue of only when . For such domains, if 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.
Keywords
Cite
@article{arxiv.2602.18138,
title = {On the weighted logarithmic potential operator},
author = {T. V. Anoop and Jiya Rose Johnson},
journal= {arXiv preprint arXiv:2602.18138},
year = {2026}
}
Comments
28 pages