S. D. Nixon, Ph.D.
Affiliations: | 2011 | Applied Mathematics | University of Colorado, Boulder, Boulder, CO, United States |
Area:
Applied Mathematics, Optics Physics, MathematicsGoogle:
"S. Nixon"Parents
Sign in to add mentorMark J. Ablowitz | grad student | 2011 | CU Boulder | |
(Development and Applications of Soliton Perturbation Theory.) |
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Publications
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Ablowitz MJ, Nixon SD, Cole JT. (2024) Switching via wave interaction in topological photonic lattices. Optics Letters. 49: 734-737 |
Nixon SD, Akylas TR, Yang J. (2017) New Aspects of Exponential Asymptotics in Multiple-Scale Nonlinear Wave Problems Studies in Applied Mathematics. 139: 223-247 |
Nixon S, Yang J. (2016) Nonlinear light behaviors near phase transition in non-parity-time-symmetric complex waveguides. Optics Letters. 41: 2747-2750 |
Nixon SD, Yang J. (2016) Bifurcation of Soliton Families from Linear Modes in Non-PT-Symmetric Complex Potentials Studies in Applied Mathematics. 136: 459-483 |
Nixon S, Yang J. (2016) All-real spectra in optical systems with arbitrary gain-and-loss distributions Physical Review A. 93 |
Yang J, Nixon S. (2016) Stability of soliton families in nonlinear Schrödinger equations with non-parity-time-symmetric complex potentials Physics Letters A. 380: 3803-3809 |
Nixon S, Yang J. (2016) Nonlinear wave dynamics near phase transition in PT-symmetric localized potentials Physica D: Nonlinear Phenomena. 331: 48-57 |
Nixon S, Yang J. (2015) Light propagation in periodically modulated complex waveguides Physical Review A. 91 |
Nixon S, Yang J. (2014) Pyramid diffraction in parity-time-symmetric optical lattices. Optics Letters. 38: 1933-5 |
Nixon SD, Yang J. (2014) Exponential Asymptotics for Solitons in PT-Symmetric Periodic Potentials Studies in Applied Mathematics |