Daniel Harry Friedan
Affiliations: | Rutgers University, New Brunswick, New Brunswick, NJ, United States |
Area:
Theoretical physicsWebsite:
http://www.physics.rutgers.edu/~friedan/Google:
"Daniel Friedan"Bio:
https://inspirehep.net/record/1009427?ln=en
Mean distance: (not calculated yet)
Parents
Sign in to add mentorIsadore M. Singer | grad student | 1980 | UC Berkeley (MathTree) | |
(Nonlinear models in 2+[epsilon] dimensions.) |
Children
Sign in to add traineeJoanne D. Cohn | grad student | 1988 | Chicago |
David Kastor | grad student | 1988 | Chicago |
BETA: Related publications
See more...
Publications
You can help our author matching system! If you notice any publications incorrectly attributed to this author, please sign in and mark matches as correct or incorrect. |
Andrei N, Fursaev D, Schweigert C, et al. (2020) Boundary and Defect CFT: Open Problems and Applications Journal of Physics A |
Friedan D. (2019) A new kind of quantum field theory of (n – 1)-dimensional defects in 2n dimensions Journal of Physics A. 52: 144001 |
Friedan D. (2017) Entropy Flow Through Near-Critical Quantum Junctions Journal of Statistical Physics. 167: 854-877 |
Friedan D. (2017) Entropy flow in near-critical quantum circuits Journal of Statistical Physics. 167: 827-853 |
Friedan D, Keller CA. (2016) Cauchy Conformal Fields in Dimensions d>2 Communications in Mathematical Physics. 1-40 |
Friedan D, Keller CA. (2013) Constraints on 2d CFT partition functions Journal of High Energy Physics. 2013 |
Friedan D, Konechny A, Schmidt-Colinet C. (2013) Precise lower bound on Monster brane boundary entropy Journal of High Energy Physics. 2013: 99 |
Friedan D, Konechny A, Schmidt-Colinet C. (2012) Lower bound on the entropy of boundaries and junctions in (1+1)-dimensional quantum critical systems. Physical Review Letters. 109: 140401 |
Friedan D, Konechny A. (2012) Curvature formula for the space of 2-d conformal field theories Journal of High Energy Physics. 2012: 113 |
Friedan D. (2010) A loop of SU(2) gauge fields stable under the Yang-Mills flow Surveys in Differential Geometry. 15: 163-236 |