David Fairlie

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David B. Fairlie (born in South Queensferry, Scotland, 1935) is a British mathematician and theoretical physicists, Professor Emeritus at the University of Durham (UK).[1]

He was educated in mathematical physics at the University of Edinburgh (B.Sc. 1957), and he earned a Ph.D. at the University of Cambridge in 1960, under the supervision of John Polkinghorne. After postdoctoral training at Princeton University and Cambridge, he was lecturer in St. Andrews (1962-64) and at Durham University (1964), retiring as Professor (2000).

He has made numerous influential contributions[2] in particle and mathematical physics, notably in the early formulation of string theory,[3] as well as the determination of the weak mixing angle in extra dimensions,[4] infinite-dimensional Lie algebras,[5] classical solutions of gauge theories, [6] higher-dimensional gauge theories,[7] and deformation quantization.[8]

He has co-authored several volumes, notably[9][10] on quantum mechanics in phase space.

References

  1. Prof Fairlie's University of Durham web-page
  2. Prof Fairlie's physics publications are available on the INSPIRE Database and the GoogleCite database .
  3. Fairlie, D. B.; Nielsen, H. B. (1970). "An analogue model for KSV theory". Nuclear Physics B 20 (3): 637. doi:10.1016/0550-3213(70)90393-7. ; Corrigan, E.; Fairlie, D. B. (1975). "Off-shell states in dual resonance theory". Nuclear Physics B 91 (3): 527. doi:10.1016/0550-3213(75)90125-X. 
  4. Fairlie, D. B. (1979). "Higgs fields and the determination of the Weinberg angle". Physics Letters B 82: 97–100. doi:10.1016/0370-2693(79)90434-9. 
  5. Fairlie, D. B.; Fletcher, P.; Zachos, C. K. (1989). "Trigonometric structure constants for new infinite-dimensional algebras". Physics Letters B 218 (2): 203. doi:10.1016/0370-2693(89)91418-4. 
  6. Corrigan, E.; Fairlie, D. B. (1977). "Scalar field theory and exact solutions to a classical SU (2) gauge theory". Physics Letters B 67: 69. doi:10.1016/0370-2693(77)90808-5. 
  7. Corrigan, E.; Devchand, C.; Fairlie, D. B.; Nuyts, J. (1983). "First-order equations for gauge fields in spaces of dimension greater than four". Nuclear Physics B 214 (3): 452. doi:10.1016/0550-3213(83)90244-4. 
  8. Fairlie, D. B. (1964). "The formulation of quantum mechanics in terms of phase space functions". Mathematical Proceedings of the Cambridge Philosophical Society 60 (3): 581. doi:10.1017/S0305004100038068. 
  9. Cosmas K. Zachos, David B. Fairlie, and Thomas L. Curtright, Quantum Mechanics in Phase Space, (World Scientific, Singapore, 2005) ISBN 978-981-238-384-6 .
  10. Thomas L Curtright, David B Fairlie, Cosmas K Zachos, A Concise Treatise on Quantum Mechanics in Phase Space, (World Scientific, Singapore, 2014) ISBN 9789814520430

External links


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