Linear stability of the elliptic relative equilibrium with (1 +n)-gon central configurations in planar n-body problem
Abstract
We study the linear stability of (1+n)-gon elliptic relative equilibrium (ERE for short), that is the Kepler homographic solution with the (1+n)-gon central configurations. We show that for n≥ 8 and any eccentricity e∈[0,1), the (1+n)-gon ERE is stable when the central mass m is large enough. Some linear instability results are given when m is small.
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