John Cardy

John L. Cardy
Born March 19, 1947
Residence Oxford
Nationality British
Fields Physics
Institutions University of Oxford
Known for Conformal field theory
Notable awards

John Lawrence Cardy FRS (born 19 March 1947, England)[1] is a British theoretical physicist at the University of Oxford. He is best known for his work in theoretical condensed matter physics and statistical mechanics, and in particular for research on critical phenomena and conformal field theory.

He was an undergraduate and postgraduate student at Downing College, University of Cambridge, before moving to the University of California, Santa Barbara, where he joined the faculty in 1977. In 1993, he moved to the University of Oxford, where he is a Fellow of All Souls College and a Professor of Physics in the Rudolf Peierls Centre for Theoretical Physics.

He was elected as a Fellow of the Royal Society in 1991,[2] received the Dirac Medal of the IoP in 2000,[3] was awarded the Lars Onsager Prize by the APS in 2004,[4] the Boltzmann Medal by IUPAP in 2010,[5] and the Dirac Medal of the International Centre for Theoretical Physics in 2011.[6]

He is most known for his contributions to conformal field theory. The famous Cardy formula for black hole entropy, the Cardy formula in percolation theory,[7] and the Cardy conditions in boundary conformal field theory are named after him.

Selected works

References

  1. Guggenheim Foundation: Annual Report 1985.
  2. "Directory of Fellows and Foreign Members". The Royal Society. Retrieved 2009-11-12.
  3. "Recipients of the Dirac medal of the Institute of Physics". Institute of Physics. Retrieved 2009-11-12.
  4. "Prize Recipient". American Physical Society. Retrieved 2009-11-12.
  5. "Boltzmann Medal". University of Melbourne. Retrieved 2010-02-08.
  6. "Dirac Medallists 2011". Retrieved 2011-08-10.
  7. John L. Cardy (February 21, 1992). "Critical Percolation in Finite Geometries". Journal of Physics A: Mathematical and General 25 (4): L201–L206. arXiv:hep-th/9111026. Bibcode:1992JPhA...25L.201C. doi:10.1088/0305-4470/25/4/009. arXiv:hep-th/9111026v1.

External links