Abstract :
[en] The eigenenergies e(N)(m;{ni,li}) of a system of N identical particles with a mass m are functions of the various radial quantum numbers ni and orbital quantum numbers li. Approximations E(N)(m;Q) of these eigenenergies, depending on a principal quantum number Q({ni,li}), can be obtained in the framework of the auxiliary field method. We demonstrate the existence of numerous exact duality relations linking quantities E(N)(m;Q) and E(p)(m';Q') for various forms of the potentials (independent of m and N) and for both nonrelativistic and semirelativistic kinematics. As the approximations computed with the auxiliary field method can be very close to the exact results, we show with several examples that these duality relations still hold, with sometimes a good accuracy, for the exact eigenenergies e(N)(m;{ni,li}).
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