Eriguchi, Hachisu, and their various Colleagues

The Beginning

Following the completion of their respective doctoral dissertations, Yoshiharu Eriguchi and Izumi Hachisu embarked upon an extremely fertile research collaboration, which over the decade of the 1980s transformed the international astrophysics community's understanding of the structure and stability of rotating, self-gravitating configurations.

Eriguchi78

Hachisu82

Principally Incompressible Configurations

ES81

Concave Hamburger: One-Ring (incompressible case)
… as categorized in 📚 Hachisu & Eriguchi (1984c); also see HE84c, below.

HES82

Concave Hamburger: One-Ring (compressible, as well as, incompressible case)
… as categorized in 📚 Hachisu & Eriguchi (1984c); also see HE84c, below.

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

NOTE: Color images copied from our separate discussion of binary mass-transfer simulations.

EHS82

Dumb-Bell: Pear-Shaped
… as categorized in 📚 Hachisu & Eriguchi (1984c); also see HE84c, below.

EH83a

Two-Ring (pt. 2)
… as categorized in 📚 Hachisu & Eriguchi (1984c); also see HE84c, below.

EH83b

Multi-Body
… as categorized in 📚 Hachisu & Eriguchi (1984c); also see HE84c, below.

HE84c

Summary

Also see our separate discussion of the Fission Hypothesis

HE84

HE83

Hachisu86a

Models having Uniform Rotation — §II.c, Eq. (11), p. 481
Models having Uniform ${\displaystyle v_{\phi }}$ — §II.c, Eq. (12), p. 481
Models having j-constant rotation — §II.c, Eq. (13), p. 481

See Also

• Properties of Maclaurin Spheroids
• Excerpts from Maclaurin's (1742) A Treatise of Fluxions
• Properties of Homogeneous Ellipsoids