White dwarfs containing orbiting planetesimals or their debris represent crucial benchmarks by which theoretical investigations of post-main-sequence planetary systems may be calibrated. The photometric transit signatures of likely planetary debris in the ZTF J0139+5245 white dwarf system has an orbital period of about 110 days. An asteroid which breaks up to produce this debris may spin itself to destruction through repeated close encounters with the star without entering its Roche radius and without influence from the white dwarf's luminosity. Here, we place coupled constraints on the orbital pericentre (q) and the ratio (β) of the middle to longest semiaxes of a triaxial asteroid which disrupts outside of this white dwarf's Roche radius (r Roche ) soon after attaining its 110-day orbit. We find that disruption within tens of years is likely when β 0.6 and q ≈ 1.0 − 2.0r Roche , and when β 0.2 out to q ≈ 2.5r Roche . Analysing the longer-timescale disruption of triaxial asteroids around ZTF J0139+5245 is desirable but may require either an analytical approach relying on ergodic theory or novel numerical techniques.
Identifying planets around O-type and B-type stars is inherently difficult; the most massive known planet host has a mass of only about 3M ⊙ . However, planetary systems which survive the transformation of their host stars into white dwarfs can be detected via photospheric trace metals, circumstellar dusty and gaseous discs, and transits of planetary debris crossing our line-of-sight. These signatures offer the potential to explore the efficiency of planet formation for host stars with masses up to the corecollapse boundary at ≈ 8M ⊙ , a mass regime rarely investigated in planet formation theory. Here, we establish limits on where both major and minor planets must reside around ≈ 6M ⊙ − 8M ⊙ stars in order to survive into the white dwarf phase. For this mass range, we find that intact terrestrial or giant planets need to leave the main sequence beyond approximate minimum star-planet separations of respectively about 3 and 6 au. In these systems, rubble pile minor planets of radii 10, 1.0, and 0.1 km would have been shorn apart by giant branch radiative YORP spin-up if they formed and remained within, respectively, tens, hundreds and thousands of au. These boundary values would help distinguish the nature of the progenitor of metal-pollution in white dwarf atmospheres. We find that planet formation around the highest mass white dwarf progenitors may be feasible, and hence encourage both dedicated planet formation investigations for these systems and spectroscopic analyses of the highest mass white dwarfs.
Escalating observations of exo-minor planets and their destroyed remnants both passing through the solar system and within white dwarf planetary systems motivate an understanding of the orbital history and fate of exo-Kuiper belts and planetesimal discs. Here we explore how the structure of a 40 − 1000 au annulus of planetesimals orbiting inside of a solar system analogue that is itself initially embedded within a stellar cluster environment varies as the star evolves through all of its stellar phases. We attempt this computationally challenging link in four parts: (1) by performing stellar cluster simulations lasting 100 Myr, (2) by making assumptions about the subsequent quiescent 11 Gyr main-sequence evolution, (3) by performing simulations throughout the giant branch phases of evolution, and (4) by making assumptions about the belt's evolution during the white dwarf phase. Throughout these stages, we estimate the planetesimals' gravitational responses to analogues of the four solar system giant planets, as well as to collisional grinding, Galactic tides, stellar flybys, and stellar radiation. We find that the imprint of stellar cluster dynamics on the architecture of 100 km-sized exo-Kuiper belt planetesimals is retained throughout all phases of stellar evolution unless violent gravitational instabilities are triggered either (1) amongst the giant planets, or (2) due to a close ( 10 3 au) stellar flyby. In the absence of these instabilities, these minor planets simply double their semimajor axis while retaining their primordial post-cluster eccentricity and inclination distributions, with implications for the free-floating planetesimal population and metal-polluted white dwarfs.
White dwarfs which exhibit transit signatures of planetary debris and accreted planetary material provide exceptional opportunities to probe the material composition and dynamical structure of planetary systems. Although previous theoretical work investigating the role of minor body disruption around white dwarfs has focussed on spherical bodies, Solar System asteroids can be more accurately modelled as triaxial ellipsoids. Here we present an analytical framework to identify the type of disruption (tidal fragmentation, total sublimation or direct impact) experienced by triaxial asteroids approaching white dwarfs on extremely eccentric (e ∼ 1) orbits. This framework is then used to identify the outcomes for simplified Main belt analogues of 100 bodies across five different white dwarf temperatures. We also present an empirical relationship between cooling age and effective temperature for both DA and DB white dwarfs to identify the age of the white dwarfs considered here. We find that using a purely spherical shape model can underestimate the physical size and radial distance at which an asteroid is subjected to complete sublimation, and these differences increase with greater elongation of the body. Contrastingly, fragmentation always occurs in the largest semi-axis of a body and so can be modelled by a sphere of that radius. Both fragmentation and sublimation are greatly affected by the body’s material composition, and hence by the composition of their progenitor asteroid belts. The white dwarf temperature, and hence cooling age, can affect the expected debris distribution: higher temperatures sublimate large elongated asteroids, and cooler temperatures accommodate more direct impacts.
<div class="page" title="Page 1"> <div class="section"> <div class="layoutArea"> <div class="column"> <p>Identifying planets around O-type and B-type stars is inherently difficult; the most massive known planet host has a mass of only about 3 M&#8857; . However, planetary systems which survive the transformation of their host stars into white dwarfs can be detected via photospheric trace metals, circumstellar dusty and gaseous discs, and transits of planetary debris crossing our line of sight.</p> <p>&#160;</p> <p>These signatures offer the potential to explore planet formation efficiency and chemical composition for host stars with masses up to the core-collapse boundary at &#8776; 8 M&#8857; , a mass regime rarely investigated in planet formation theory. Here, we establish limits on where both major and minor planets must reside around &#8776; 6&#8211;8 M&#8857; stars in order to survive into the white dwarf phase. For this mass range, we find that intact terrestrial or giant planets need to leave the main sequence beyond approximate minimum star&#8211;planet separations of, respectively, about 3 and 6 au, as shown here:</p> <p><img src="data:image/png;base64, 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Increasing observations of white dwarf atmospheric pollution and disrupting planetesimals is driving increased studies into the fate of exo-asteroids around post-main-sequence stars. Planetesimal populations in the Solar System which are most likely to survive the violent post-main-sequence evolution, such as the Kuiper Belt, display a large binary fraction with a propensity for near equal-mass components and provide a previously unexplored population of planetesimals which are likely to exist around white dwarfs. Here we simulate the dynamical evolution of equal-mass binary asteroid systems around white dwarfs using the N-body integrator REBOUND for 1 Gyr. We confirm that giant planets are efficient at dissociating and ejecting binary asteroid systems on eccentric orbits, while Earth-mass planets are better at keeping planetesimals in their planetary systems. We find binary systems can be dissociated and ejected from their systems across Myr timescales, producing interstellar objects. We do not expect a population of free-floating binary asteroid systems as all ejected planetesimals are gravitationally unbound from each other. Further, we discuss the influence of asteroid binarity on the white dwarf pollution process and find there is little to no impact on how close a body can get to a star. However, the orbital evolution of binary asteroids changes the distribution of planetesimals available in a white dwarf planetary system to be further scattered onto white dwarf polluting orbits.
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