Resultado de búsqueda
Former President International Mathematical Union. Research Interests. John Ball's main research areas lie in the calculus of variations, nonlinear partial differential equations, infinite-dimensional dynamical systems and their applications to nonlinear mechanics.
- John Ball | Mathematical Institute - University of Oxford
John Ball's main research areas lie in the calculus of...
- John Ball | Mathematical Institute - University of Oxford
Sir John Macleod Ball FRS FRSE (born 19 May 1948) is a British mathematician and former Sedleian Professor of Natural Philosophy at the University of Oxford. He was the president of the International Mathematical Union from 2003 to 2006 and a Fellow of Queen's College, Oxford.
John Ball's main research areas lie in the calculus of variations, nonlinear partial differential equations, infinite-dimensional dynamical systems and their applications to nonlinear mechanics. In solid mechanics, he is especially interested in the mathematics of microstructure arising from phase transformations in solids, using models based ...
John Ball. Heriot-Watt University, Edinburgh and University of Oxford. Verified email at hw.ac.uk - Homepage. Mathematics Materials Science. Articles Cited by Public access Co-authors. Title. ... JM Ball, JE Marsden, M Slemrod. SIAM Journal on Control and Optimization 20 (4), 575-597, 1982. 412:
John Ball is Sedleian Professor of Natural Philosophy at the Mathematical Institute, University of Oxford and Fellow of The Queen's College. Before this he was Professor of Applied Analysis at Heriot-Watt University from 1982-1996.
6 de sept. de 2015 · J.M. Ball, K. Koumatos, H.Seiner Nucleation of austenite in mechanically stabilized martensite by localized heating Journal of Alloys and Compounds 577S(2013)S37-S42 pdf file; J. M. Ball, K. Koumatos, An investigation of non-planar austenite-martensite interfaces, Mathematical Models and Methods in Applied Sciences, 24 (10), 1937-1956, 2014.
31 de jul. de 2023 · John M. Ball. We make some remarks on the linear wave equation concerning the existence and uniqueness of weak solutions, satisfaction of the energy equation, growth properties of solutions, the passage from bounded to unbounded domains, and reconciliation of different representations of solutions. Comments:
