Convexity properties of the difference over the real axis between the Steklov zeta functions of a smooth planar domain with 2π perimeter and of the unit disk

Abstract

We consider the zeta function ζ for the Dirichlet-to-Neumann operator of a simply connected planar domain bounded by a smooth closed curve of perimeter 2π. We prove that ζ''(0) ζD''(0) with equality if and only if is a disk where D denotes the closed unit disk. We also provide an elementary proof that for a fixed real s satisfying s-1 the estimate ζ''(s) ζD''(s) holds with equality if and only if is a disk. We then bring examples of domains close to the unit disk where this estimate fails to be extended to the interval (0,2). Other computations related to previous works are also detailed in the remaining part of the text.