Spectral instability of the regular n-gon elliptic relative equilibrium in the planar n-body problem

Abstract

The regular n-gon elliptic relative equilibrium (ERE) is a Kepler homographic solution generated by the regular n-gon central configuration, and its linear stability depends on the eccentricity e∈[0,1). While Moeckel Moe1 established the spectral instability for this solution at e=0 for all n≥3, it remained unknown whether instability persists for e ∈ (0,1). This paper resolves this problem: we prove that the regular n-gon ERE is spectral instability for all n≥ 3 and e ∈ [0,1). Furthermore, we introduce the β-system which related the Lagrange solution, and we developed an estimation method that, by testing the hyperbolicity of the β-system at a finite number of points alone, allows us to obtain extensive hyperbolic regions. As a corollary, for n=3,4,5, we uniformly demonstrate that the instability is hyperbolic (and hence stronger) for all e ∈ [0,1).

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