Isospectral surfaces of small genus

Abstract

In this note, we will construct simple examples of isospectral surfaces. In what follows, we will use the term “surface” to mean a surface endowed with a Riemannian metric, while the term “Riemann surface” will be reserved for a surface endowed with a metric of constant curvature. We will show: THEOREM 1. There exist pairs of surfaces S₁ and S₂ of genus 3, such that S₁ and S₂ are isospectral but not isometric.THEOREM 2. There exist pairs of Riemann surfaces S₁ and S₂ of genus 4 and 6, which are isospectral but not isometric.THEOREM 3. There exist unoriented surfaces S₁ and S₂ of Euler characteristic X(S₁) = X(S₂) = — 6 which are isospectral but not isometric.