Draft:Timothy Healey (mathematician)
Submission declined on 26 August 2024 by Ktkvtsh (talk). This submission's references do not show that the subject qualifies for a Wikipedia article—that is, they do not show significant coverage (not just passing mentions) about the subject in published, reliable, secondary sources that are independent of the subject (see the guidelines on the notability of people). Before any resubmission, additional references meeting these criteria should be added (see technical help and learn about mistakes to avoid when addressing this issue). If no additional references exist, the subject is not suitable for Wikipedia.
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Submission declined on 7 August 2024 by CFA (talk). This draft's references do not show that the subject qualifies for a Wikipedia article. In summary, the draft needs to Declined by CFA 3 months ago.
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- Comment: Reads like a resume. See WP:NOTRESUME. There is an overuse of hyperlinks. With his research topics being advanced, context needs to be added for a general audience. Ktkvtsh (talk) 00:01, 26 August 2024 (UTC)
Timothy J. Healey | |
---|---|
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 nolinear elasticity, nonlinear partial differential equations, bifurcation theory and the calculus of variations..[1]. He is currently a professor in the Department of Mathematics, Cornell University[2].
Healey is known for his mathematical contributions to nonlinear elasticity particularly the use of group-theoretic methods in global bifurcation problems.[3][4]
Education and Career
[edit]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[5]. 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[6]. 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[7].
Research
[edit]Healey's research focuses on mathematical aspects of elasticity theory[8]. In his early career, he made fundamental contributions to the study of global bifurcations in problems with symmetry using group-theoretic methods[9]. 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[10][11]. Healey's work on transverse hemitropy and isotropy in Cosserat rod theory is well known and is a natural setting for studying the mechanics of ropes, cables and biological filaments such as DNA[12][13]. Along with Krömer, he established an almost everywhere local invertibility result for 2nd gradient elasticity which is now widely used in deriving Euler-Lagrange equations in nonlinear elasticity[14][15]
References
[edit]- ^ "Timothy J. Healey". Cornell University Mathematics Department. Cornell University. Retrieved 7 June 2024.
- ^ "Cornell Math department faculty". Cornell University.
- ^ Antman, Stuart (2005). Nonlinear Problems of Elasticity. Applied Mathematical Sciences. Vol. 107 (2nd ed.). Springer New York, NY. pp. 142, 236, 318, 533. doi:10.1007/0-387-27649-1. ISBN 978-0-387-20880-0.
- ^ "Healey's google scholar". Google Scholar. Retrieved 7 June 2024.
- ^ "Short biography of Timothy Healey" (PDF). Cornell University Mathematics department. Cornell University. Retrieved 7 June 2024.
- ^ "Mathematics genealogy of Timothy Healey". Mathematics Genealogy. Mathematics Genealogy project. Retrieved 7 June 2024.
- ^ "Timothy Healey biography" (PDF). UIUC Structural engineering seminar series. University of Illinois, Urbana-Champaign.
- ^ "Helaey's google scholar". Google Scholar. Retrieved 7 June 2024.
- ^ "Symposium Jean Mandel: Problems in Non-Linear Mechanics" (PDF). Laboratoire de Mécanique des Solides. Ecole Polytechnique. Retrieved 7 June 2024.
- ^ Ciarlet, Philippe G (2021). Mathematical elasticity: Three-dimensional elasticity. Society for Industrial and Applied Mathematics. p. xv (Preface). doi:10.1137/1.9781611976786. ISBN 978-1-611976-77-9. Retrieved 7 June 2024.
- ^ Ball, John M. (2002). Newton, Paul; Holmes, Philip; Weinstein, Alan (eds.). Some open problems in elasticity (in Geometry, mechanics, and dynamics) (1 ed.). Springer. p. 26. doi:10.1007/b97525. ISBN 978-0-387-95518-6. Retrieved 7 June 2024.
- ^ Antman, Stuart (2005). Nonlinear Problems of Elasticity. Applied Mathematical Sciences. Vol. 107 (2nd ed.). Springer New York, NY. pp. 309–318. doi:10.1007/0-387-27649-1. ISBN 978-0-387-20880-0.
- ^ Healey, Timothy (2002). "Material symmetry and chirality in nonlinearly elastic rods". Mathematics and Mechanics of Solids. 7 (4): 405–240. doi:10.1177/108128028 (inactive 1 November 2024). Retrieved 25 August 2024.
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: CS1 maint: DOI inactive as of November 2024 (link) - ^ Kružík, Martin; Roubíček, Tomáš (2019). Mathematical methods in continuum mechanics of solids (1 ed.). Springer. p. 43. ISBN 978-3-030-02064-4.
- ^ Benesova, Barbora; Kružík, Martin (2017). "Weak lower semicontinuity of integral functionals and applications". SIAM Review. 59 (4): 703–766. arXiv:1601.00390. doi:10.1137/16M1060947. Retrieved 25 August 2024.
Category:Living people Category:20th-century American mathematicians Category:21st-century American mathematicians Category:Mathematical analysts Category:Applied mathematicians