R.H. Bruck | |
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Bruck (right) with Karl W. Gruenberg (center) and Kurt Hirsch
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Born | December 26, 1914 |
Residence | United States |
Alma mater | University of Toronto |
Known for | Loops, Bruck–Ryser Theorem, Finite Nets, Bruck–Bose Construction |
Spouse(s) | Helen |
Awards |
Guggenheim Fellowship Chauvenet Prize (1956) |
Scientific career | |
Fields | Mathematics |
Institutions | University of Wisconsin–Madison |
Thesis | The General Linear Group in a Field of Characteristic p (1940) |
Doctoral advisor | Richard Brauer |
Doctoral students | Lowell J. Paige Erwin Kleinfeld Daniel R. Hughes George I. Glauberman William Kantor Michael G. Aschbacher Gary L. Ebert Sue Whitesides + 23 others |
Richard Hubert Bruck (December 26, 1914 – 1991) was an American mathematician best known for his work in the field of algebra, especially in its relation to projective geometry and combinatorics.
Bruck studied at the University of Toronto, where he received his doctorate in 1940 under the supervision of Richard Brauer. He spent most his career as a professor at University of Wisconsin–Madison, advising at least 31 doctoral students.
He is best known for his 1949 paper coauthored with H. J. Ryser, the results of which became known as the Bruck–Ryser theorem (now known in a generalized form as the Bruck-Ryser-Chowla theorem), concerning the possible orders of finite projective planes.
In 1946, he was awarded a Guggenheim Fellowship. In 1956, he was awarded the Chauvenet Prize for his article Recent Advances in the Foundations of Euclidean Plane Geometry. In 1962, he was an invited speaker at the International Congress of Mathematicians in . In 1963, he was a Fulbright Lecturer at the University of Canberra. In 1965 a Groups and Geometry conference was held at the University of Wisconsin in honor of Bruck's retirement.