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140122 ||| eng |
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|a 9781461590477
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100 |
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|a Mishchenko, E.
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245 |
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|a Differential Equations with Small Parameters and Relaxation Oscillations
|h Elektronische Ressource
|c by E. Mishchenko
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250 |
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|a 1st ed. 1980
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260 |
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|a New York, NY
|b Springer US
|c 1980, 1980
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300 |
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|a X, 228 p
|b online resource
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505 |
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|a I. Dependence of Solutions on Small Parameters. Applications of Relaxation Oscillations -- 1. Smooth Dependence. Poincaré’s Theorem -- 2. Dependence of Solutions on a Parameter, on an Infinite Time Interval -- 3. Equations with Small Parameters Multiplying Derivatives -- 4. Second-Order Systems. Fast and Slow Motion. Relaxation Oscillations -- 5. Systems of Arbitrary Order. Fast and Slow Motion. Relaxation Oscillations -- 6. Solutions of the Degenerate Equation System -- 7. Asymptotic Expansions of Solutions with Respect to a Parameter -- 8. A Sketch of the Principal Results -- II. Second-Order Systems. Asymptotic Calculation of Solutions -- 1. Assumptions and Definitions -- 2. The Zeroth Approximation -- 3. Asymptotic Approximations on Slow-Motion Parts of the Trajectory -- 4. Proof of the Asymptotic Representations of the Slow-Motion Part -- 5. Local Coordinates in the Neighborhood of a Junction Point --
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505 |
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|a 18. Derivation of Asymptotic Representations for the Fast-Motion Part -- 19. Special Variables for the Drop Part -- 20. Asymptotic Approximations of the Drop Part of the Trajectory -- 21. Proof of Asymptotic Representations for the Drop Part of the Trajectory -- 22. Asymptotic Approximations of the Trajectory for Initial Slow-Motion and Drop Parts -- III. Second-Order Systems. Almost-Discontinuous Periodic solutions -- 1. Existence and Uniqueness of an Almost-Discontinuous Periodic Solution -- 2. Asymptotic Approximations for the Trajectory of a Periodic Solution -- 3. Calculation of the Slow-Motion Time -- 4. Calculation of the Junction Time -- 5. Calculation of the Fast-Motion Time -- 6. Calculation of the Drop Time -- 7. An Asymptotic Formula for the Relaxation-Oscillation Period -- 8. Van der Pol’s Equation. Dorodnitsyn’s Formula -- IV. Systems of Arbitrary Order. Asymptotic Calculation of Solutions -- 1. Basic Assumptions -- 2. The Zeroth Approximation --
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|a 6. Asymptotic Approximations of the Trajectory on the Initial Part of a Junction -- 7. The Relation between Asymptotic Representations and Actual Trajectories in the Initial Junction Section -- 8. Special Variables for the Junction Section -- 9. A Riccati Equation -- 10. Asymptotic Approximations for the Trajectory in the Neighborhood of a Junction Point -- 11. The Relation between Asymptotic Approximations and Actual Trajectories in the Immediate Vicinity of a Junction Point -- 12. Asymptotic Series for the Coefficients of the Expansion Near a Junction Point -- 13. Regularization of Improper Integrals -- 14. Asymptotic Expansions for the End of a Junction Part of a Trajectory -- 15. The Relation between Asymptotic Approximations and Actual Trajectories at the End of a Junction Part -- 16. Proof of Asymptotic Representations for the Junction Part -- 17. Asymptotic Approximations of theTrajectory on the Fast-Motion Part --
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|a 3. Local Coordinates in the Neighborhood of a Junction Point -- 4. Asymptotic Approximations of a Trajectory at the Beginning of a Junction Section -- 5. Asymptotic Approximations for the Trajectory in the Neighborhood of a Junction Point -- 6. Asymptotic Approximation of a Trajectory at the End of a Junction Section -- 7. The Displacement Vector -- V. Systems of Arbitrary Order. Almost-Discontinuous Periodic Solutions -- 1. Auxiliary Results -- 2. The Existence of an Almost-Discontinuous Periodic Solution. Asymptotic Calculation of the Trajectory -- 3. An Asymptotic Formula for the Period of Relaxation Oscillations -- References
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|a Humanities and Social Sciences
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653 |
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|a Humanities
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653 |
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|a Social sciences
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041 |
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|a eng
|2 ISO 639-2
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989 |
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|b SBA
|a Springer Book Archives -2004
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490 |
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|a Mathematical Concepts and Methods in Science and Engineering
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028 |
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|a 10.1007/978-1-4615-9047-7
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856 |
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|u https://doi.org/10.1007/978-1-4615-9047-7?nosfx=y
|x Verlag
|3 Volltext
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|a 001.3
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|a 300
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