Gregor Kovačič

Gregor Kovačič

Gregor Kovačič received batchelor's degrees in Physics and Mathematics from the University of Ljubljana, Slovenia, and a Ph.D. in Applied Mathematics from California Institute of Technology.  He was a Postdoctoral Fellow at the Los Alamos National Laboratory before joining the Mathematical Sciences Faculty at Rensselaer.  Gregor is the recipient of a Prešeren's Student Prize in Slovenia, a Director's Funded Postdoctoral Fellowship at Los Alamos, an NSF Career Award, and a Sloan Research Fellowship.

Gregor's research began in low-dimensional dynamical systems, in particular, in singular perturbation theory of systems with internal resonances.   His current research interests include studies of nonlinear evolution equations and their scientific applications, particularly in dispersive waves, optics, and neuroscience. Recently, he has been exploring dynamics and statistics of dispersive wave-like and completely integrable partial differential equations and their applications to nonlinear resonant optics, light propagation through “metamaterials” with exotic properties of the refractive index, and the modeling of and dynamics in neuronal networks. 

  • Ph.D. California Institute of Technology, Applied Mathematics, 1990

  • Q. L. Gu, Z. K. Tian, G. Kovacic, D. Zhou, and D. Cai [2018]. The Dynamics of Balanced Spiking Neuronal Networks Under Poisson Drive Is Not Chaotic, Frontiers in Computational Neuroscience 12, 47.
  • W. Lee, G. Kovacic, and D. Cai [2018]. Cascade model of wave turbulence, Phys. Rev. E 97, 062140.
  • S. Li, G. Biondini, G. Kovacic, and I. R. Gabitov, [2018]. Resonant optical pulses on a continuous wave background in two-level active media, Europhysics Letters 121, 2
  • V. J. Barranca, G. Kovacic, D. Zhou, and D. Cai [2016]. Improved Compressive Sensing of Natural Scenes Using Localized Random Sampling, Nature Scientific Reports 6, 31976.
  • V. J. Barranca, G. Kovacic, D. Zhou, and D. Cai [2016]. Efficient Image Processing Via Compressive Sensing of Integrate-And-Fire Neuronal Network Dynamics, Neurocomputing 171, 1313-1322.
  • D. Kraus, G. Biondini, and G. Kovacic [2015]. The focusing Manakov system with nonzero boundary conditions, Nonlinearity 28(9), 3101.
  • V. J. Barranca, G. Kovacic, D. Zhou, and D. Cai [2014]. Sparsity and Compressed Coding in Sensory Systems, PLOS Comput. Biol. 10(8), e1003793.
  • G. Biondini and G. Kovacic [2014]. Inverse scattering transform for the focusing nonlinear Schroedinger equation with nonzero boundary conditions, J. Math. Phys. 55(3), 031506.