c9 A. Goriely. Noeuds: Genèse d'une Théorie Mathématique by A. Sossinsky. A book review. Notices of the AMS 2000. 47, 6.
j18 J. Lega and A. Goriely. Pulse, fronts and oscillation of an elastic rod. Physica D: Nonlinear Phenomena. 1999. 132, 3.
j17 M. Nizette and A. Goriely. Towards a classification of Euler-Kirchhoff filaments. Journal of Mathematical Physics. 1999. 40.
c8 A. Goriely and M. Tabor. The looping of twisted elastic rods. IN G. Hunt, M. Thompson and A. R. Champneys (Eds.) Localisation and solitary waves in solid mechanics. 1999. World Scientific.
j16 A. Goriely and C. Hyde. Finite time blow-up in dynamical systems. Physics Letters A. 1998. 250.
j15 A. Goriely and M. Tabor. The mechanics and dynamics of tendril perversion in climbing plants. Physics Letters A. 1998. 250.
j14 A. Goriely and M. Tabor. The role of complex-time singularities in chaotic dynamics. Regular and Chaotic Dynamics. 1998. 3, 3.
j13 A. Goriely and M. Tabor. Spontaneous helix-hand reversal and tendril perversion in climbing plants. Physical Review Letters. 1998. 80.
j12 A. Goriely and M. Tabor. Nonlinear Dynamics of Filaments IV: The spontaneous looping of twisted elastic rods. Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences. 2008. 455. 1998.
j11 A. Goriely and M. Tabor. Nonlinear Dynamics of Filaments III: Instabilities of Helical Rods. Royal Society A: Mathematical, Physical and Engineering Sciences. 1997. 453, 1967.
j10 A. Goriely and M. Tabor. Nonlinear Dynamics of Filaments II: Nonlinear analysis. Physica D: Nonlinear Phenomena. 1997. 105, 1-3.
j9 A. Goriely and M. Tabor. Nonlinear Dynamics of Filaments I: Dynamical Instabilities. Physica D: Nonlinear Phenomena. 1997. 105, 1-3.
j8 A. Goriely and M. Tabor. New amplitude equations for thin elastic rods. Physical Review Letters. 1996. 77. 17.
j7 A. Goriely. Integrability, Partial Integrability and Nonintegrability for Systems of Ordinary Differential Equations. Journal of Mathematical Physics. 1996. 37.
j6 A. Goriely. A simple solution to the nonlinear front problem. Physical Review Letters. 1995. 75.
j5 T. Bountis, A. Goriely and M. Kolman. Mel’nikov vector for N-dimensional mappings. Physics Letters A. 1995. 206.
j4 A. Goriely and M. Tabor. The Singularity Analysis for Nearly Integrable Systems: Homoclinic Intersections and Local Multivaluedness. Physica D: Nonlinear Phenomena. 1995. 85, 1-2.
c7 L. Brenig and A. Goriely. Painlevé analysis and normal forms theory. IN E.Tournier (Ed.) Computer Algebra and Differential Equations. Cambridge University Press. 1994.
c6 A. Goriely and M. Tabor. How to Compute the Melnikov vector? IN Proceedings of the International Symposium on Symbolic and Algebraic Computation ISSAC 1994. ACM Press.