Explicit fundamental gap estimates for some convex domains in H2

Abstract

Motivated by an example of Shih, we compute the fundamental gap of a family of convex domains in the hyperbolic plane H2, showing that for some of them λ2 - λ1 < 3π2D2, where D is the diameter of the domain and λ1, λ2 are the first and second Dirichlet eigenvalues of the Laplace operator on the domain. The result contrasts with what is known in Rn or Sn, where λ2 - λ1 ≥ 3 π2D2 for convex domains. We also show that the fundamental gap of the example in Shih's article is still greater than 32 π2D2, even though the first eigenfunction of the Laplace operator is not log-concave.