Infinitely many isolas of modulational instability for Stokes waves

Abstract

This paper proves long-standing conjectures regarding the existence of infinitely many high-frequency modulational instability ``isolas" for a Stokes wave in arbitrary depth h > 0 , under longitudinal perturbations. We provide a complete characterization of the unstable spectral bands in the L2(R)-spectrum of the water wave equations linearized around a Stokes wave of sufficiently small amplitude ε. The unstable spectrum is the union of isolated ``isolas" of elliptical shape, indexed by integers p≥ 2 , each with semiaxis of size |β1(p) (h)| εp+ O(εp+2 ). As first key achievement, we obtain an explicit formula for the coefficient β1(p) (h) for any p ≥ 2 , that remarkably depends solely on the maximal Taylor-Fourier coefficients of the Stokes wave. We provide simple expressions of the asymptotic expansion of such coefficients in the shallow-water limit h 0+ , for any p ≥ 2 . This allows to establish that the analytic function β1(p)(h) is not zero for any p ≥ 2, by verifying that a combinatorial sum is not zero; this relies on a crucial combinatorial identity due to Koutschan, van Hoeij, and Zeilberger.

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