Maria A. Agrotis, Ph.D.
Affiliations: | 2002 | University of Arizona, Tucson, AZ |
Area:
MathematicsGoogle:
"Maria Agrotis"Parents
Sign in to add mentor| Nicholas Ercolani | grad student | 2002 | University of Arizona | |
| (Pure and applied reflections on the reduced Maxwell -Bloch system.) | ||||
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. |
| Agrotis MA, Damianou PA. (2007) Volterra's realization of the KM-system Journal of Mathematical Analysis and Applications. 325: 157-165 |
| Agrotis MA, Damianou PA. (2007) The modular hierarchy of the Toda lattice Differential Geometry and Its Application. 25: 655-666 |
| Agrotis MA. (2006) Prolongation loop algebras for a solitonic system of equations Symmetry, Integrability and Geometry: Methods and Applications (Sigma). 2 |
| Agrotis MA, Damianou PA, Sophocleous C. (2006) The Toda lattice is super-integrable Physica a: Statistical Mechanics and Its Applications. 365: 235-243 |
| Agrotis MA, Damianou PA, Marmo G. (2005) A symplectic realization of the Volterra lattice Journal of Physics a: Mathematical and General. 38: 6327-6334 |
| Glasgow SA, Agrotis MA, Ercolani NM. (2005) An integrable reduction of inhomogeneously broadened optical equations Physica D: Nonlinear Phenomena. 212: 82-99 |
| Agrotis M, Kevrekidis PG, Malomed BA. (2005) Transmission of nonlinear localized modes through waveguide bends Mathematics and Computers in Simulation. 69: 223-234 |
| Agrotis MA. (2003) Soliton solutions for the interaction of light and matter Physics Letters, Section a: General, Atomic and Solid State Physics. 315: 81-92 |
| Agrotis M. (2003) Hamiltonian flows for a reduced Maxwell-Bloch system with permanent dipole Physica D: Nonlinear Phenomena. 183: 141-158 |
| Agrotis M, Ercolani NM, Glasgow SA, et al. (2000) Complete integrability of the reduced Maxwell—Bloch equations with permanent dipole Physica D: Nonlinear Phenomena. 138: 134-162 |