Citation: Mj. Ablowitz et G. Biondini, MULTISCALE PULSE DYNAMICS IN COMMUNICATION-SYSTEMS WITH STRONG DISPERSION MANAGEMENT, Optics letters, 23(21), 1998, pp. 1668-1670
Authors:
ABLOWITZ MJ
BIONDINI G
CHAKRAVARTY S
JENKINS RB
SAUER JR
Citation: Mj. Ablowitz et al., 4-WAVE-MIXING IN WAVELENGTH-DIVISION-MULTIPLEXED SOLITON SYSTEMS - IDEAL FIBERS, Journal of the Optical Society of America. B, Optical physics, 14(7), 1997, pp. 1788-1794
Citation: Mj. Ablowitz et al., THE NONLINEAR SCHRODINGER-EQUATION - ASYMMETRIC PERTURBATIONS, TRAVELING WAVES AND CHAOTIC STRUCTURES, Mathematics and computers in simulation, 43(1), 1997, pp. 3-12
Citation: Mj. Ablowitz et J. Villarroel, SOLUTIONS TO THE TIME-DEPENDENT SCHRODINGER AND THE KADOMTSEV-PETVIASHVILI EQUATIONS, Physical review letters, 78(4), 1997, pp. 570-573
Citation: Mj. Ablowitz et Xp. Wang, INITIAL TIME LAYERS AND KADOMTSEV-PETVIASHVILI-TYPE EQUATIONS, Studies in applied mathematics, 98(2), 1997, pp. 121-137
Citation: Mj. Ablowitz et al., ON THE NUMERICAL-SOLUTION OF THE SINE-GORDON EQUATION .2. PERFORMANCEOF NUMERICAL SCHEMES, Journal of computational physics, 131(2), 1997, pp. 354-367
Citation: Se. Mock et al., MULTIPLE-SCALE DERIVATION OF THE NONLINEAR SCHRODINGER-EQUATION FOR SOLITONS IN MAGNETIC THIN-FILMS, Journal of applied physics, 81(8), 1997, pp. 5080-5080
Citation: Mj. Ablowitz et al., COMPUTATIONAL CHAOS IN THE NONLINEAR SCHRODINGER-EQUATION WITHOUT HOMOCLINIC CROSSINGS, Physica. A, 228(1-4), 1996, pp. 212-235
Authors:
ABLOWITZ MJ
BIONDINI G
CHAKRAVARTY S
JENKINS RB
SAUER JR
Citation: Mj. Ablowitz et al., 4-WAVE-MIXING IN WAVELENGTH-DIVISION-MULTIPLEXED SOLITON SYSTEMS - DAMPING AND AMPLIFICATION, Optics letters, 21(20), 1996, pp. 1646-1648
Citation: S. Chakravarty et Mj. Ablowitz, INTEGRABILITY, MONODROMY EVOLVING DEFORMATIONS, AND SELF-DUAL BIANCHI-IX SYSTEMS, Physical review letters, 76(6), 1996, pp. 857-860
Citation: Mj. Ablowitz et al., ON THE NUMERICAL-SOLUTION OF THE SINE-GORDON EQUATION .1. INTEGRABLE DISCRETIZATIONS AND HOMOCLINIC MANIFOLDS, Journal of computational physics, 126(2), 1996, pp. 299-314
Citation: Mj. Ablowitz et S. Delillo, PARAMETRIC FORCING, BOUND-STATES AND SOLUTIONS OF A NONLINEAR SCHRODINGER TYPE EQUATION, Nonlinearity, 7(4), 1994, pp. 1143-1153
Citation: Tr. Taha et al., SOLITONS, NONLINEAR-WAVE EQUATIONS AND COMPUTATION - FOREWORD, Mathematics and computers in simulation, 37(4-5), 1994, pp. 247-247
Citation: Mj. Ablowitz et Cm. Schober, HOMOCLINIC MANIFOLDS AND NUMERICAL CHAOS IN THE NONLINEAR SCHRODINGER-EQUATION, Mathematics and computers in simulation, 37(4-5), 1994, pp. 249-264
Citation: Bm. Herbst et al., SYMPLECTIC METHODS FOR THE NONLINEAR SCHRODINGER-EQUATION, Mathematics and computers in simulation, 37(4-5), 1994, pp. 353-369
Citation: Xp. Wang et al., WAVE COLLAPSE AND INSTABILITY OF SOLITARY WAVES OF A GENERALIZED KADOMTSEV-PETVIASHVILI EQUATION, Physica. D, 78(3-4), 1994, pp. 241-265