Hidehiko Yamabe was a Japanese mathematician. Above all, he is famous for discovering that every conformal class on a smooth compact manifold is represented by a Riemannian metric of constant scalar curvature. Other notable contributions include his definitive solution of Hilbert's fifth problem.
After graduating from the University of Tokyo in 1947, Yamabe became an assistant at Osaka University. From 1952 until 1954 he was an assistant at Princeton University, receiving his Ph.D. from Osaka University while at Princeton. He left Princeton in 1954 to become assistant professor at the University of Minnesota. Except for one year as a professor at Osaka University, he stayed in Minnesota until 1960. Yamabe died suddenly of a stroke in November 1960, just months after accepting a full professorship at Northwestern University.
The Yamabe Memorial Lecture and the Yamabe Symposium
After coming back to Japan, Etsuko Yamabe and her daughters lived with the benefits of Hidehiko's social security and of funds raised privately by her and her husband's friends in the United States of America. When she had achieved some financial stability, it was her wish to return the kindness shown to her in a time of great need by setting up funds for an annual lecture, to be alternatively held at Northwestern and Minnesota University: the Yamabe Memorial Lecture was so established, and was able to attract distinguished lecturers as Eugenio Calabi. Further funding permitted the expansion of the lecture to the present state bi-annual Yamabe Symposium.
Work
Research activity
Yamabe published eighteen papers on various mathematical topics:. These have been collected and published as a book, edited by Ralph Philip Boas, Jr. for Gordon and Breach Science Publishers. Half of Yamabe's papers concern the theory ofLie groups and related topics. However, he is best known today for his remarkable posthumous paper, "On a deformation of Riemannian structures on compact manifolds," Osaka Math. J. 12 21–37. This paper claims to prove that any Riemannian metric on any compact manifold without boundary is conformal to another metric for which the scalar curvature is constant. This assertion, which naturally generalizes the uniformization of Riemann surfaces to arbitrary dimensions, is completely correct, as is the broad outline of Yamabe's proof. However, Yamabe's argument contains a subtle analytic mistake arising form the failure of certain natural inclusions of Sobolev spaces to be compact. This mistake was only corrected in stages, on a case-by-case basis, first by Trudinger, then by Aubin, and finally, in full generality, by Schoen. Yamabe's visionary paper thereby became a cornerstone of modern Riemannnian geometry, and is thus largely responsible for his posthumous fame. For example, as of January 16, 2015, MathSciNet records 186 citations of Yamabe's 1960 paper in the Osaka Journal, compared with only 148 citations of all of his other publications combined. As of January 16, 2015, MathSciNet also lists 997 reviews containing the word "Yamabe." This, of course, is notably larger than the number of papers that explicitly cite any of Yamabe's articles. However, the vast majority of these reviews contain one of the phrases "scalar curvature" or "Yamabe equation," referring to Yamabe's equation governing the behavior of the scalar curvature under conformal rescaling. In this sense, the influence of Yamabe's 1960 paper in the Osaka Journal has become such a universal fixture of current mathematical thought that it is often implicitly referred to without an explicit citation.
