Dirichlet spectrum and Green function

Abstract

In the first part of this article we obtain an identity relating the radial spectrum of rotationally invariant geodesic balls and an isoperimetric quotient Σ 1/λi rad=∫ V(s)/S(s)ds. We also obtain upper and lower estimates for the series Σ λi-2() where is an extrinsic ball of a proper minimal surface of R3. In the second part we show that the first eigenvalue of bounded domains is given by iteration of the Green operator and taking the limit, λ1()=k ∞ Gk(f)2/ Gk+1(f)2 for any function f>0. In the third part we obtain explicitly the L1(, μ)-momentum spectrum of a bounded domain in terms of its Green operator. In particular, we obtain the first eigenvalue of a weighted bounded domain in terms of the L1(, μ)-momentum spectrum, extending the work of Hurtado-Markvorsen-Palmer on the first eigenvalue of rotationally invariant balls.