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008 140928s2009 riua ob 000 0 eng
020 _a9781470405403 (online)
040 _aDLC
_cDLC
_dYDX
_dBTCTA
_dYDXCP
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_dPIT
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050 0 0 _aQA377
_b.D86 2009
082 0 0 _a515/.3534
_222
245 0 4 _aThe dynamics of modulated wave trains /
_h[electronic resource]
_cArjen Doelman ... [et al.].
260 _aProvidence, R.I. :
_bAmerican Mathematical Society,
_c2009.
300 _a1 online resource (vii, 105 p. : ill.)
490 1 _aMemoirs of the American Mathematical Society,
_x0065-9266 (print);
_x1947-6221 (online);
_vv. 934
500 _a"Volume 199, number 934 (fifth of 6 numbers)."
500 _a"May 2009."
504 _aIncludes bibliographical references (p. 103-105).
505 0 0 _tChapter 1. Introduction
_tChapter 2. The Burgers equation
_tChapter 3. The complex cubic Ginzburg-Landau equation
_tChapter 4. Reaction-diffusion equations: Set-up and results
_tChapter 5. Validity of the Burgers equation in reaction-diffusion equations
_tChapter 6. Validity of the inviscid Burgers equation in reaction-diffusion systems
_tChapter 7. Modulations of wave trains near sideband instabilities
_tChapter 8. Existence and stability of weak shocks
_tChapter 9. Existence of shocks in the long-wavelength limit
_tChapter 10. Applications
506 1 _aAccess is restricted to licensed institutions
533 _aElectronic reproduction.
_bProvidence, Rhode Island :
_cAmerican Mathematical Society.
_d2012
538 _aMode of access : World Wide Web
588 _aDescription based on print version record.
650 0 _aReaction-diffusion equations.
650 0 _aApproximation theory.
650 0 _aBurgers equation.
700 1 _aDoelman, A.
776 0 _iPrint version:
_tdynamics of modulated wave trains /
_w(DLC) 2008055480
_x0065-9266
_z9780821842935
786 _dAmerican mathematical Society
830 0 _aMemoirs of the American Mathematical Society ;
_vno. 934.
856 4 _3Contents
_uhttp://www.ams.org/memo/0934
856 4 _3Contents
_uhttp://dx.doi.org/10.1090/memo/0934
942 _2EBK13387
_cEBK
999 _c42681
_d42681