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Timothy J. Healey | |
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Nationality | American |
Alma mater | University of Illinois |
Scientific career | |
Fields | Mathematics, Continuum Mechanics |
Institutions |
Cornell University University of Maryland |
Thesis | Symmetry, Bifurcation, and Computational Methods in Nonlinear Structural Mechanics (1985) |
Doctoral advisor | Robert Muncaster |
Timothy J. Healey is an American applied mathematician working in the areas of nonlinear elasticity, partial differential equations and the calculus of variations [1]. He is currently a professor in the Department of Mathematics, Cornell University [2].
Healey received his bachelor's degree in engineering from the University of Missouri in 1976 and worked as a structural engineer between 1978 and 1980 [3]. He received his PhD from the University of Illinois at Urbana-Champaign in 1985 under the guidance of Robert Muncaster in mathematics with mentoring from Donald Carlson and Arthur Robinson in mechanics [4]. He spent a postdoctoral year with Stuart Antman at the University of Maryland before joining the faculty at Cornell University, where he has held full-time positions in the Department of Theoretical and Applied Mechanics, Mechanical and Aerospace engineering and Mathematics [5].
Healey's research focuses on mathematical aspects of elasticity theory [6]. In his early career, he made fundamental contributions to the study of global bifurcations in problems with symmetry using group-theoretic methods [7]. He is also known for development of a topological degree similar to the Leray-Schauder degree which leads to the existence of solutions in nonlinear elasticity [8] [9].
Category:Living people Category:20th-century American mathematicians Category:21st-century American mathematicians Category:Mathematical analysts Category:Applied mathematicians