The Stable Topology of the Planetary Systems of two 2:1 Resonant Companions:Application to HD 82943

Abstract

We have numerically explored the stable planetary geometry for the multiple systems involved in a 2:1 mean motion resonance, and herein we mainly study the HD 82943 system by employing two sets of the orbital parameters (Mayor et al. 2004; Ji et al. 2004). In the simulations, we find that all stable orbits are related to the 2:1 resonance that can help to remain the semi-major axes for two companions almost unaltered over the secular evolution for 108 yr. In addition, we also show that there exist three possible stable configurations:(1) Type I, only θ1 ≈ 0, (2) Type II, θ1≈θ2≈θ3≈ 0 (aligned case), and (3) Type III, θ1≈ 180, θ2≈0, θ3≈180 (antialigned case), where two resonant arguments are θ1 = λ1 - 2λ2 + 1 and θ2 = λ1 - 2λ2 + 2, the relative apsidal longitudes θ3 = 1-2=Δ. And we find that other 2:1 resonant systems (e.g., GJ 876) may possess one of three stable orbits in their realistic motions. Moreover, we also study the existence of the assumed terrestrial bodies at 1 AU for HD 82943 and GJ 876 systems (see main texts).

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