We consider a gas of bosons interacting through a hard-sphere potential with radius a in the thermodynamic limit. We derive an upper bound for the ground state energy per particle at low density. Our bound captures the leading term 4 pi rho a and shows that corrections are smaller than C rho a(rho a(3))(1/2), for a sufficiently large constant C>0. In combination with a known lower bound, our result implies that the first sub-leading term to the ground state energy of a dilute gas of hard spheres is, in fact, of the order rho a(rho a(3))(1/2), in agreement with the Lee-Huang-Yang prediction.
Basti, G., Cenatiempo, S., Giuliani, A., Olgiati, A., Pasqualetti, G., Schlein, B. (2024). Upper Bound for the Ground State Energy of a Dilute Bose Gas of Hard Spheres. ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS, 248(6) [10.1007/s00205-024-02049-w].
Upper Bound for the Ground State Energy of a Dilute Bose Gas of Hard Spheres
Cenatiempo, Serena;Giuliani, Alessandro;Olgiati, Alessandro;
2024-01-01
Abstract
We consider a gas of bosons interacting through a hard-sphere potential with radius a in the thermodynamic limit. We derive an upper bound for the ground state energy per particle at low density. Our bound captures the leading term 4 pi rho a and shows that corrections are smaller than C rho a(rho a(3))(1/2), for a sufficiently large constant C>0. In combination with a known lower bound, our result implies that the first sub-leading term to the ground state energy of a dilute gas of hard spheres is, in fact, of the order rho a(rho a(3))(1/2), in agreement with the Lee-Huang-Yang prediction.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
