Université de Bordeaux (Part 2)

Exterior Gravitational Potential of Toroids

J. -M. Huré, B. Basillais, V. Karas, A. Trova, & O. Semerák (2020), MNRAS, 494, 5825-5838 have published a paper titled, The Exterior Gravitational Potential of Toroids. Here we examine how their work relates to the published work by C.-Y. Wong (1973, Annals of Physics, 77, 279), which we have separately discussed in detail.

We discuss this topic in a separate, accompanying chapter.

Spheroid-Ring Systems

Through a research collaboration at the Université de Bordeaux, B. Basillais & J. -M. Huré (2019), MNRAS, 487, 4504-4509 have published a paper titled, Rigidly Rotating, Incompressible Spheroid-Ring Systems: New Bifurcations, Critical Rotations, and Degenerate States.

Key References

Here are some relevant publications:

• Hachisu (1986a, ApJS, 61, 479):   A Versatile Method for Obtaining Structures of Rapidly Rotating Stars
• Fujisawa & Eriguchi (2014, MNRAS, 438, L61):   Prolate stars due to meridional flows
• Huré, Hersant & Nasello (2018, MNRAS, 475, 63):   The equilibrium of overpressurized polytropes
• & Eriguchi (1984, Ap&SS, 99, 71):   Fission Sequence and Equilibrium Models of [Rigidly] Rotating Polytropes
• Hachisu, Eriguchi & Nomoto (1986b, ApJ, 311, 214):   Fate of merging double white dwarfs. II - Numerical method
• Nishida, Eriguchi & Lanza (1992, ApJ, 401, 618):   General Relativistic Structure of Star-Toroid Systems
• Woodward, Sankaran & Tohline (1992 ApJ, 394, 248):   Tidal Disruption of a Star by a Massive Disk (The Axisymmetric Roche Problem)

Especially,

• Eriguchi & Hachisu (1983, Prog. Theor. Phys., 69, 1131):   Two Kinds of Axially Symmetric Equilibrium Sequences of Self-Gravitating and Rotating Incompressible Fluids:  Two-Ring Sequence and Core-Ring Sequence
• Ansorg, Kleinwächter & Meinel (2003, MNRAS, 339, 515):   Uniformly rotating axisymmetric fluid configurations bifurcating from highly flattened Maclaurin spheroids
• Hachisu, Eriguchi & Nomoto (1986a, ApJ, 308, 161):   Fate of Merging Double White Dwarfs

Key Figures

Eriguchi & Hachisu (1983)

Fig. 3 extracted without modification from p. 1134 of Eriguchi & Hachisu (1983) "Two Kinds of Axially Symmetric Equilibrium Sequences of Self-Gravitating and Rotating Incompressible Fluids: Two-Ring Sequence and Core-Ring Sequence" Progress of Theoretical Physics, vol. 69, pp. 1131-1136 © Progress of Theoretical Physics

CAPTION:  The angular momentum-angular velocity relations. Solid curves represent uniformly rotating equilibrium sequences. MS:   Maclaurin spheroid sequence JE:   Jacobi ellipsoid sequence OR:   one-ring sequence The number and letter R or C attached to a curve denote mass ratio and two-ring or core-ring sequence, respectively. If differential rotation is allowed, the equilibrium sequences may continue to exist as shown by the dashed curves.

AKM (2003)

Fig. 3 extracted without modification from p. 1134 of Eriguchi & Hachisu (1983) "Two Kinds of Axially Symmetric Equilibrium Sequences of Self-Gravitating and Rotating Incompressible Fluids: Two-Ring Sequence and Core-Ring Sequence" Progress of Theoretical Physics, vol. 69, pp. 1131-1136 © Progress of Theoretical Physics

CAPTION:  The angular momentum-angular velocity relations. Solid curves represent uniformly rotating equilibrium sequences. MS:   Maclaurin spheroid sequence JE:   Jacobi ellipsoid sequence OR:   one-ring sequence The number and letter R or C attached to a curve denote mass ratio and two-ring or core-ring sequence, respectively. If differential rotation is allowed, the equilibrium sequences may continue to exist as shown by the dashed curves.