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## Summary

In astrophysics, the Bondi accretion (also called Bondi–Hoyle–Lyttleton accretion), named after Hermann Bondi, is spherical accretion onto a compact object traveling through the interstellar medium. It is generally used in the context of neutron star and black hole accretion. To achieve an approximate form of the Bondi accretion rate, accretion is assumed to occur at a rate

${\dot {M}}\simeq \pi R^{2}\rho v,$ .

where:

• $\rho$ is the ambient density
• $v$ is the object's velocity $v_{o}$ or the sound speed $c_{s}$ in the surrounding medium if $v_{o} • $R$ is the Bondi radius, defined as $2GM/c_{s}^{2}$ .

The Bondi radius comes from setting escape velocity equal to the sound speed and solving for radius. It represents the boundary between subsonic and supersonic infall. Substituting the Bondi radius in the above equation yields:

${\dot {M}}\simeq {\frac {\pi \rho G^{2}M^{2}}{c_{s}^{3}}}$ .

These are only scaling relations rather than rigorous definitions. A more complete solution can be found in Bondi's original work and two other papers.

## Application to accreting protoplanets

When a planet is forming in a protoplanetary disk, it needs the gas in the disk to fall into its Bondi sphere in order for the planet to be able to accrete an atmosphere. For a massive enough planet, the initial accreted gas can quickly fill up the Bondi sphere. At this point, the atmosphere must cool and contract (through the Kelvin–Helmholtz mechanism) for the planet to be able to accrete more of an atmosphere.