An improved upper bound for the second eigenvalue on tori

Abstract

In this paper, we study the maximization problem of the second non-zero Laplace eigenvalue λ2(T,g) on a torus T, among all unit-area metrics in a fixed conformal class. First, we obtain a new upper bound for λ2(Ta,b,g) on any flat torus Ta, b with (a, b)∈ R2. Our bound improves the general estimate λ2(Ta, b,g) 4Ac(Ta, b, [g]) in the case of the torus. As applications, we derive a uniform upper bound λ2(T,g)< 16π23 for any torus T and any metric g, and reduce the Kao-Lai-Osting conjecture to proving an upper bound for λ2(Ta,b,g) on the specific family of flat tori Ta,b with 0≤ a≤ 12 and 1-a2≤ b≤ 1.76.