Keplerian frequency of uniformly rotating neutron stars and quark stars

We calculate Keplerian (mass shedding) configurations of rigidly rotating neutron stars and quark stars with crusts. We check the validity of empirical formula for Keplerian frequency, f_K, proposed by Lattimer & Prakash, f_K(M)=C (M/M_sun)^1/2 (R/10km)^-3/2, where M is the (gravitational) mass of Keplerian configuration, R is the (circumferential) radius of the non-rotating configuration of the same gravitational mass, and C = 1.04 kHz. Numerical calculations are performed using precise 2-D codes based on the multi-domain spectral methods. We use a representative set of equations of state (EOSs) of neutron stars and quark stars. We show that the empirical formula for f_K(M) holds within a few percent for neutron stars with realistic EOSs, provided 0.5 M_sun < M < 0.9 M_max,stat, where M_max,stat is the maximum allowable mass of non-rotating neutron stars for an EOS, and C=C_NS=1.08 kHz. Similar precision is obtained for quark stars with 0.5 M_sun < M < 0.9 M_max,stat. For maximal crust masses we obtain C_QS = 1.15 kHz, and the value of C_QS is not very sensitive to the crust mass. All our C’s are significantly larger than the analytic value from the relativistic Roche model, C_Roche = 1.00 kHz. For 0.5 M_sun < M < 0.9 M_max,stat, the equatorial radius of Keplerian configuration of mass M, R_K(M), is, to a very good approximation, proportional to the radius of the non-rotating star of the same mass, R_K(M) = aR(M), with a_NS \approx a_QS \approx 1.44. The value of a_QS is very weakly dependent on the mass of the crust of the quark star. Both a’s are smaller than the analytic value a_Roche = 1.5 from the relativistic Roche model.

💡 Research Summary

The paper presents a systematic study of the Keplerian (mass‑shedding) limit for uniformly rotating neutron stars and quark stars, using high‑precision two‑dimensional numerical models based on multi‑domain spectral methods. The authors first compute a representative set of non‑rotating (static) stellar configurations for a variety of realistic equations of state (EOS) – including several modern nuclear‑matter EOS for neutron stars (e.g., APR, SLy, GM1) and a range of quark‑matter models such as the MIT bag model, NJL, and CFL phases. For each EOS they then construct a sequence of rigidly rotating models, gradually increasing the angular velocity until the equatorial effective gravity vanishes, which defines the Keplerian configuration. The corresponding Keplerian frequency f_K and equatorial radius R_K are recorded for each gravitational mass M.

The central aim is to test the empirical formula proposed by Lattimer & Prakash: \