On higher order isolas of unstable Stokes waves

Abstract

We overview the recent result [3, Theorem 1.1] about the high-frequency instability of Stokes waves subject to longitudinal perturbations. The spectral bands of unstable eigenvalues away from the origin form a sequence of isolas parameterized by an integer p ≥ 2 for any value of the depth h > 0 such that an explicit analytic function β1(p)(h) is not zero. In [3] it is proved that the map h β1(p)(h) is not identically zero for any p ≥ 2 by showing that h 0+β1(p)(h) = - ∞ . In this manuscript we compute the asymptotic expansion of β1(p)(h) in the deep-water limit h + ∞ -- it vanishes exponentially fast to zero -- for p=2, 3, 4.