Shadowing (Differentiable dynamical systems)See also what's at your library, or elsewhere.
Broader term:Used for:- Shadowing theorem
- Theorem, Shadowing
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Filed under: Shadowing (Differentiable dynamical systems)
Items below (if any) are from related and broader terms.
Filed under: Differentiable dynamical systems- Singularities of Transition Processes in Dynamical Systems: Qualitative Theory of Critical Delays (EJDE monograph #5, 2004), by A. N. Gorban' (PDF with commentary at ams.org)
- Exploring Discrete Dynamics: The DDLab Manual (Frome, UK: Luniver Press, c2011), by Andrew Wuensche (PDF and page images with commentary in the UK)
- Flavors of Geometry (1997), ed. by Silvio Levy (PDF files with commentary at msri.org)
- The Hopf Bifurcation and Its Applications (1976), by Jerrold E. Marsden and Marjorie McCracken (PDF files at Caltech)
- Jacobi Operators and Completely Integrable Nonlinear Lattices, by Gerald Teschl (PDF and other formats in Austria)
- Stability region maximization by decomposition-aggregation method (National Aeronautics and Space Administration ;, 1974), by Dragoslav D. Siljak, S. M. Cuk, George C. Marshall Space Flight Center, and University of Santa Clara (page images at HathiTrust)
- Decomposition-aggregation stability analysis (National Aeronautics and Space Administration ;, 1973), by Dragoslav D. Siljak, S. M. Cuk, S. Weissenberger, George C. Marshall Space Flight Center, and University of Santa Clara (page images at HathiTrust)
- Decoupling in linear time-varying multivariable systems (National Aeronautics and Space Administration ;, 1973), by Viswanathan Sankaran and Langley Research Center (page images at HathiTrust)
Filed under: Chaotic behavior in systems -- CongressesFiled under: Differentiable dynamical systems -- PeriodicalsFiled under: Chaotic behavior in systems
Filed under: Chaotic behavior in systems -- FictionFiled under: Chaotic behavior in systems in literatureFiled under: Flows (Differentiable dynamical systems)- NASA TN D-4040 (National Aeronautics and Space Administration ;, 1967), by Charles E. Feiler, Marcus F. Heidmann, Lewis Research Center, and United States National Aeronautics and Space Administration (page images at HathiTrust)
- NASA TN D-5634 (National Aeronautics and Space Administration ;, 1970), by Heinz G. Struck, George C. Marshall Space Flight Center, and United States National Aeronautics and Space Administration (page images at HathiTrust)
- High order accuracy computational methods for long time integration of nonlinear PDEs in complex domains (Arlington, Virginia : Air Force Office of Scientific Research, Air Research and Development Command, United States Air Force, 1999., 1999), by David Gottlieb, Brown University. Division of Applied Mathematics, and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
- Stagnation and wake flows normal to a flat surface (Dahlgren, Virginia : U.S. Naval Weapons Laboratory, Computation and Analysis Laboratory, 1963., 1963), by Schwiderski Ernst W., Hans J. Lugt, and Naval Weapons Laboratory (U.S.) (page images at HathiTrust)
- Stagnation and wake flows normal to a flat surface (Dahlgren, Virginia : U.S. Naval Weapons Laboratory, Computation and Analysis Laboratory, 1963., 1963), by Schwiderski Ernst W., Hans J. Lugt, and Naval Weapons Laboratory (U.S.) (page images at HathiTrust)
Filed under: Hamiltonian systems- HARPA: A Versatile Three-Dimensional Hamiltonian Ray-Tracing Program for Acoustic Waves in the Atmosphere Above Irregular Terrain (Boulder, CO: U.S. Dept. of Commerce, National Oceanic and Atmospheric Administration, Environmental Research Laboratories, 1986), by R. Michael Jones, J. P. Riley, and T. M. Georges (page images at HathiTrust)
- Separation of variables in the special diagonal Hamilton-Jacobi equation : application to the dynamical problem of a particle constrained on a moving surface (National Aeronautics and Space Administration ;, 1973), by David L. Blanchard, F. K. Chan, and Goddard Space Flight Center (page images at HathiTrust)
- Strangeness changing neutral curren ts and non-leptonic decays of hadrons. (Rochester, New York. : University of Rochester, Department of Physics and Astronomy, 1966., 1966), by G. S. Guralnik, Laxman Krishna Rao Pandit, V. S. Mathur, U.S. Atomic Energy Commission, and University of Rochester. Department of Physics and Astronomy (page images at HathiTrust)
- A Hamiltonian model of Lorentz invariant particle intereactions (Rochester, New York : Department of Physics and Astronomy, University of Rochester 1963., 1963), by T. F. Jordan, U.S. Atomic Energy Commission. New York Operations Office, and University of Rochester. Department of Physics and Astronomy (page images at HathiTrust)
- Lie transforms and their use in Hamiltonian perturbation theory (Washington, D.C. : Department of Energy, Assistant Secretary for Energy Technology, Division of Applied Plasma Physics, 1979., 1979), by John R. Cary, Lawrence Berkeley Laboratory, and United States. Department of Energy. Division of Applied Plasma Physics (page images at HathiTrust)
- Quasi-finiteness of the interaction Hamiltonian of certain quantum fields (Washington D. C. : Mathematical Sciences Directorate, Office of Scientific Research, U.S. Air Force, 1960., 1960), by I. E. Segal, University of Chicago. Department of Mathematics, and United States. Air Force. Office of Scientific Research (page images at HathiTrust)
- Nonanalytic eigenvalues of the Hamiltonian of broken chiral symmetry (Argonne, Illinois : High Energy Physics Division, Argonne National Laboratory, 1970., 1970), by Yasunori Fujii, U.S. Atomic Energy Commission, and Argonne National Laboratory. High Energy Physics Division (page images at HathiTrust)
- Reduction of the 4th-order asymmetric-rotor Hamiltonian (L. G. Hansom Field, Bedford, Massachusetts : Air Force Cambridge Research Laboratories, Office of Aerospace Research, United States Air Force, 1966., 1966), by F. X. Kneizys, S. A. Clough, J. N. Freedman, and Air Force Cambridge Research Laboratories (U.S.) (page images at HathiTrust)
Filed under: Hamilton-Jacobi equations -- Numerical solutionsFiled under: Viscosity solutionsFiled under: Limit cyclesFiled under: Point mappings (Mathematics)Filed under: Random dynamical systems |