000 | 01878nmm a2200193Ia 4500 | ||
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008 | 230306s9999||||xx |||||||||||||||||und|| | ||
020 | _a9780821879696 (online) | ||
245 | 0 |
_aMathematical studies in nonlinear wave propagation : _bNSFCBMS Regional Research Conference on Mathematical Methods in Nonlinear Wave Propagation, North Carolina A&T State University, Greensboro, North Carolina, May 1519, 2002 |
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260 |
_aProvidence, R.I. : _bAmerican Mathematical Society, _cc2005 |
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300 | _a1 online resource (x, 211 p. : ill.) | ||
490 |
_aContemporary mathematics _vv. 379 _x10983627 |
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504 | _aIncludes bibliographical references. | ||
505 |
_tAn introduction to wave equations ; On the ZakharovShabat eigenvalue problem ; Solitons and inverse scattering transform ; A tailmatching method for the linear stability of multivectorsoliton bound states ; Trapping light with grating defects ; Thermoelasticplastic transition ; Regularized quasiNewton method with continuous inversion of _F'+\epsilon I _ for monotone illposed operator equations ; Transition layers for a singularly perturbed neutral delay differential equation ; Nonlinear aeroacoustics computations by the CESE method ; Robust and simple nonreflecting boundary conditions for the Euler equations a new approach based on the spacetime CESE method ; Physical and numerical modeling of seismic wave propagation _rRonald E Mickens ; Martin Klaus ; Tuncay Aktosun ; Jianke Yang ; R H Goodman R E Slusher M I Weinstein and M Klaus ; Bolindra N Borah ; Alexandra B Smirnova ; Wenzhang Huang ; Ching Y Loh ; S C Chang A Himansu C Y Loh X Y Wang and S T Yu ; G Tang D Clemence C Jackson Q Lin and V Burbach |
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650 | _aNonlinear theories | ||
650 | _aWave motion, Theory of | ||
700 | _aClemence Dominic P | ||
700 | _aTang Guoqing | ||
856 | _uhttp://www.ams.org/conm/379/ | ||
999 |
_c28796 _d28796 |