Apps/EriguchiHachisu/Models
Eriguchi, Hachisu, and their various Colleagues
Following the completion of their respective doctoral dissertations, Yoshiharu Eriguchi and Izumi Hachisu embarked upon an extremely fertile research collaboration which, especially over the decade of the 1980s, transformed the international astrophysics community's understanding of the structure and stability of rotating, self-gravitating fluid configurations. Others — including myself (J.E.T.) — were drawn into, and benefitted significantly from participation in, various ones of these collaborative research efforts. In what follows, we list and summarize the key results from a significant number of these "Eriguchi and Hachisu" collaborative publications.
Our list is broken into two broad topical categories: Principally Uniformly Rotating, Incompressible Configurations (polytropic index, ) and Principally Differentially Rotating, Compressible Configurations (polytropic index, ). The efforts by both Eriguchi and Hachisu to extend our understanding of incompressible configurations beyond the Maclaurin spheroid sequence and the Jacobi/Dedekind sequence — more broadly, Riemann S-type ellipsoids — is summarized in HE84c.
Kickoff
Eriguchi78
Y. Eriguchi (1978)
Hydrostatic Equilibria of Rotating Polytropes
Publications of the Astronomical Society of Japan, Vol. 30, pp. 507 - 518
(p. 515): "This paper is based on the author's dissertation, submitted to the University of Tokyo, in partial fulfillment of the requirements for the doctorate."
Hachisu82
📚 Hachisu (1982)
Gravothermal and Gravogyro Catastrophes of Rotating and Self-Gravitating Gaseous Disks
Publications of the Astronomical Society of Japan, Vol. 34, pp. 313 - 335
(p. 333): "This paper is based on the author's dissertation, submitted to the University of Tokyo, in partial fulfillment of the requirements for the doctorate."
Principally Uniformly Rotating, Incompressible Configurations
ES81
Concave Hamburger: One-Ring (incompressible case)
… as categorized in 📚 Hachisu & Eriguchi (1984c); also see HE84c, below.
Another Equilibrium Sequence of Self-Gravitating and Rotating Incompressible Fluid
Progress of Theoretical Physics, Vol. 65, No. 6, pp. 1870 - 1875
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HES82
Concave Hamburger: One-Ring (compressible, as well as, incompressible case)
… as categorized in 📚 Hachisu & Eriguchi (1984c); also see HE84c, below.
Rapidly Rotating Polytropes and Concave Hamburger Equilibrium
Progress of Theoretical Physics, Vol. 68, No. 1, pp. 191 - 205
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NOTE: In this HES82 publication, the authors point out (with attending explanation) that some of the modeling results published earlier by 📚 Fukushima, Eriguchi, Sugimoto, & Bisnovatyi-Kogan (1980) are demonstratively wrong.
EH82
Triangle: Square: Ammonite and Two-Ring (pt. 1)
… as categorized in 📚 Hachisu & Eriguchi (1984c); also see HE84c
New Equilibrium Sequences Bifurcating from Maclaurin Sequence
Progress of Theoretical Physics, Vol. 67, No. 3, pp. 844 - 851
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NOTE: Color images copied from our separate discussion of binary mass-transfer simulations. |
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EHS82
Dumb-Bell: Pear-Shaped
… as categorized in 📚 Hachisu & Eriguchi (1984c); also see HE84c, below.
Dumb-Bell-Shape Equilibria and Mass-Shedding Pear-Shape
of Selfgravitating Incompressible Fluid
Progress of Theoretical Physics, Vol. 67, No. 4, pp. 1068 - 1075
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EH83a
Two-Ring (pt. 2)
… as categorized in 📚 Hachisu & Eriguchi (1984c); also see HE84c, below.
Two Kinds of Axially Symmetric Equilibrium Sequences of Self-Gravitating and Rotating Incompressible Fluid
— Two-Ring Sequence and Core-Ring Sequence —
Progress of Theoretical Physics, Vol. 69, No. 4, pp. 1131 - 1136
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EH83b
Multi-Body
… as categorized in 📚 Hachisu & Eriguchi (1984c); also see HE84c, below.
Gravitational Equilibrium of a Multi-Body Fluid System
Progress of Theoretical Physics, Vol. 70, No. 6, pp. 1534 - 1541
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HE84c
Summary
Fission Sequence and Equilibrium Models of Rigidity [sic] Rotating Polytropes
in Double Stars, Physical Properties and Generic Relations; Proceedings of IAU Colloquium No. 80 held at Lambing, Java, June 3-7, 1983
Editors: Bambang Hidayat, Zdenek Kopal, Jurgen Rahe; Dordrecht, D. Reidel Publishing Co.
Astrophysics & Space Science, Vol. 99, pp. 71 - 74
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Also see our separate discussion of the Fission Hypothesis |
HE84
Bifurcation Points on the Maclaurin Sequence
Publications of the Astronomical Society of Japan, Vol. 36, No. 3, pp. 497 - 503
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HE83
Bifurcations and Phase Transitions of Self-Gravitating and Uniformly Rotating Fluid
Monthly Notices of the Royal Astronomical Society, Vol. 204, pp. 583 - 589
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Principally Differentially Rotating, Compressible Configurations
Hachisu86a
A Versatile Method for Obtaining Structures of Rapidly Rotating Stars
The Astrophysical Journal Supplement Series, Vol. 61, pp. 479 - 507
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Models having Uniform Rotation — §II.c, Eq. (11), p. 481 |
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Models having Uniform — §II.c, Eq. (12), p. 481 |
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Models having j-constant rotation — §II.c, Eq. (13), p. 481 |
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See Also
- Properties of Maclaurin Spheroids
- Excerpts from Maclaurin's (1742) A Treatise of Fluxions
- Properties of Homogeneous Ellipsoids
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Appendices: | VisTrailsEquations | VisTrailsVariables | References | Ramblings | VisTrailsImages | myphys.lsu | ADS | |