Envelopes for orbits around axially symmetric sources with spheroidal shape

Abstract

We introduce a method to obtain the envelopes of eccentric orbits in axially symmetric potentials, (R,z), endowed with z-symmetry of reflection. By making the transformation z→ a+a2+ z2, with a>0, we compute the resulting mass density, referred here as the effective density ef(R,z;a), in order to calculate the envelopes Z(R) of orbits in the meridional plane (R,z). We find that they obey the approximated formula Z(R) [ ef(R;a≈ 0)]-1/3, where ef(R;a) is the integrated surface density associated with ef(R,z;a). As examples we consider the dynamics in two potentials: the monopole plus quadrupole and the Kalnajs disc.