4JOLICOEUR C, CARDOU A. A numerical comparison of current mathematical models of twisted wire cables under axisymmetric loads[J]. J. Energy Resources and Technology, 1991, 113(2): 241-249.
5JOLICOEUR C, CARDOU A. Semicontinuous mathematical for bending of multilayered wire strands[J]. Journal of Engineering Mechanics, 1996,122(4): 643-650.
6PHILLIPS J W, COSTELLO G A. Analysis of wire ropes with internal-wire rope cores[J]. J. Appl. Mech., 1985, 52(3): 510-516.
7JIANG W G, HENSHALL J L, WALTON J M. A concise finite element nodel for three-layered straight wire rope strand[J]. International Journal of Mechanical Sciences, 2000, 42(1): 63-86.
8Lee W K, Casey N F, Gray T G. Helix geometry in wire rope[J]. Wire Industry, 1987, 54(644): 461-468.
9Lee W K. An insight into wire rope geometry[J]. International Journal of Solids arid Structures, 1991, 28(4) : 471-490.
10Hobbs R E, Nabijou S. Changes in wire curvature as a wire rope is bent over a sheave[J]. Journal of Strain Analysis for Engineering Design, 1995, 30(4): 271-281.
3ERDONMEZ C, IMRAK C E. A finite element model for in- dependent wire rope core with double helical geometry sub- jected to axial loads [ J ]. Sadhana ,2011,36 ( 6 ) :995-1008.
4USABIAGA H, PAGALDAY J M. Analytical procedure for modelling reeursively and wire by wire stranded ropes sub- jected to traction and torsion loads[ J ]. International Jour- nal of Solids and Structures,2008,45 (21) :5503-5520.
5STANOVA E, FEDORKO G, FABIAN M, et al. Computer modelling of wire strands and ropes Part I : Theory and com- puter implementation [ J]. Advances in engineering soft- ware,2011,42 (6) :305-315.
6COSTELLO G A. Theory of wire rope [ M ]. Berlin : Spring- er, 1997.
7FEYRER K. Wire ropes [ M ]. Berlin: Springer-Verlag Ber- lin Heidelberg,2007.