Constraining quadratic f(R) gravity from astrophysical observations of the pulsar J0704+6620

Document Type

Article

Publication Date

9-1-2023

Abstract

We apply quadratic f(R) = R + ϵR 2 field equations, where ϵ has a dimension [L2], to static spherical stellar model. We assume the interior configuration is determined by Krori-Barua ansatz and additionally the fluid is anisotropic. Using the astrophysical measurements of the pulsar PSR J0740+6620 as inferred by NICER and XMM observations, we determine ϵ ≈ ± 3 km2. We show that the model can provide a stable configuration of the pulsar PSR J0740+6620 in both geometrical and physical sectors. We show that the Krori-Barua ansatz within f(R) quadratic gravity provides semi-analytical relations between radial, pr , and tangential, pt , pressures and density ρ which can be expressed as pr ≈ vr2 (ρ-ρ 1) and pr ≈ vt2 (ρ-ρ 2), where vr (vt ) is the sound speed in radial (tangential) direction, ρ 1 = ρs (surface density) and ρ 2 are completely determined in terms of the model parameters. These relations are in agreement with the best-fit equations of state as obtained in the present study. We further put the upper limit on the compactness, C = 2GMRs-1 c -2, which satisfies the f(R) modified Buchdahl limit. Remarkably, the quadratic f(R) gravity with negative ϵ naturally restricts the maximum compactness to values lower than Buchdahl limit, unlike the GR or f(R) gravity with positive ϵ where the compactness can arbitrarily approach the black hole limit C → 1. The model predicts a core density a few times the saturation nuclear density ρ nuc = 2.7 × 1014 g/cm3, and a surface density ρs > ρnuc . We provide the mass-radius diagram corresponding to the obtained boundary density which has been shown to be in agreement with other observations.

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