216.523.7567
SI 104
r.deissler@csuohio.edu

Selected Publications

• R. J. Deissler, "Dipole in a Magnetic Field, Work, and Quantum Spin", Phys. Rev. E 77, 036609 (2008). PDF



• R. J. Deissler, "The Appearance, Apparent Speed, and Removal of Optical Effects for Relativistically Moving Objects", Am. J. Phys. 73, 663 (2005). PDF



• R. J. Deissler and H. R. Brand, "The Effect of Nonlinear Gradient Terms on Breathing Localized Solutions in the Complex Ginzburg-Landau Equation", Phys. Rev. Lett. 81, 3856 (1998). PDF



• R. J. Deissler and H. R. Brand, "Interaction of Breathing Localized Solutions for Subcritical Bifurcations", Phys. Rev. Lett. 74, 4847 (1995). PDF



• R. J. Deissler, "Thermally-Sustained Structure in Convectively Unstable Systems", Phys. Rev. E 49, R31 (1994). PDF



• R. J. Deissler and H. R. Brand, "Periodic, Quasiperiodic, and Chaotic Localized Solutions of the Quintic Complex Ginzburg-Landau Equation", Phys. Rev. Lett. 72, 478 (1994). PDF



• R. J. Deissler and A. Oron, "Stable Localized Patterns in Thin Liquid Films", Phys. Rev. Lett. 68, 2948 (1992). PDF



• R. J. Deissler and J. D. Farmer, "Deterministic Noise Amplifiers", Physica D 55, 155 (1992). PDF



• R. J. Deissler, Y. C. Lee, and H. R. Brand, "Confined States in Phase Dynamics: The Influence of Boundary Conditions and Transient Behavior", Phys. Rev. A 42, 2101 (1990). PDF



• H. R. Brand and R. J. Deissler, "Confined States in Phase Dynamics", Phys. Rev. Lett. 63, 508 (1989). PDF



• R. J. Deissler, "External Noise and the Origin and Dynamics of Structure in Convectively Unstable Systems", J. Stat. Phys. 54, 1459 (1989). PDF



• R. J. Deissler, "The Convective Nature of Instability in Plane Poiseuille Flow", Physics of Fluids 30, 2303 (1987). PDF



• R. J. Deissler, R. Ecke, and H. Haucke, "Universal Scaling and Transitory Behavior of Temporal Modes Near a Hopf Bifurcation: Theory and Experiment", Physical Review A 36, 4390 (1987). PDF



• R. J. Deissler, "Spatially-Growing Waves, Intermittency, and Convective Chaos in an Open Flow System", Physica D 25, 233 (1987).



• R. J. Deissler and K. Kaneko, "Velocity-Dependent Liapunov Exponents as a Measure of Chaos for Open Flow Systems", Physics Letters A 119, 397 (1987).



• R. J. Deissler, "Noise-Sustained Structure, Intermittency, and the Ginzburg- Landau Equation", J. Stat. Phys. 40 Nos. 3/4, 371 (1985). PDF