Improved asymptotics of the spectral gap for the Mathieu operator

Abstract

The Mathieu operator equation* L(y)=-y"+2a (2x)y, a∈ C,\;a≠ 0, equation* considered with periodic or anti-periodic boundary conditions has, close to n2 for large enough n, two periodic (if n is even) or anti-periodic (if n is odd) eigenvalues λn-, λn+. For fixed a, we show that equation* λn+ - λn-= 8(a/4)n[(n-1)!]2 [1 - a24n3+ O (1n4)], n→∞. equation* This result extends the asymptotic formula of Harrell-Avron-Simon, by providing more asymptotic terms.