References
- Chen, R. Z. (1995). Theory of ring spinning balloons. Journal of Donghua University (Natural Sciences), (4), 32–43.
- De Barr, A. E. (1961). The role of air drag in spinning. Text. Inst J, 52, 126–139.
- De Barr, A. E. (1958). 5—A descriptive account of yarn tensions and balloon shapes in ring spinning. Journal of the Textile Institute Transactions, 49(2), T58–T88. doi:10.1080/19447025808660123
- Fraser, W. B. (1993). Air drag and friction in the two-for-one twister: Results from the theory. The Journal of the Textile Institute, 84(3), 364–375. doi:10.1080/00405009308658969
- Fraser, W. B. (1993). On the theory of ring spinning. Philosophical Transactions: Physical Sciences and Engineering, 342(1665), 439–468.
- Gu, H. B., & Chen, R. Z. (1998). Approximate solution of spatial balloon curve caused by air drag in ring spinning process. Journal of Donghua University (Natural Sciences), 24(4), 51–54.
- Hossain, M., Abdkader, A., & Cherif, C. (2018). Analysis of yarn properties in the superconducting magnetic bearing-based ring spinning process. Textile Research Journal J, 88(22), 2624–2638. doi:10.1177/0040517517725122
- Hossain, M., Telke, C., Abdkader, A., Cherif, C., & Beitelschmidt, M. (2016). Mathematical modeling of the dynamic yarn path depending on spindle speed in a ring spinning process. Textile Research Journal, 86(11), 1180–1190. doi:10.1177/0040517515606355
- Li, X. R., Chang, W. W., & Wang, S. Z. (2018). Motion of positive winding of ring spinning frame. Journal of Donghua University (English Edition), 35(4), 309–314.
- Tala-Tebue, E., Djoufack, Z. I., Djimeli-Tsajio, A., & Kenfack-Jiotsa, A. (2018). Solitons and other solutions of the nonlinear fractional zoomeron equation. Chinese Journal of Physics, 56(3), 1232–1246. doi:10.1016/j.cjph.2018.04.017
- Tang, Z. X., Fraser, W. B., & Wang, X. (2007). Modelling yarn balloon motion in ring spinning. Applied Mathematical Modelling, 31(7), 1397–1410. doi:10.1016/j.apm.2006.03.031
- Tran, C. D., Phillips, D. G., & Fraser, W. B. (2010). Stationary solution of the ring-spinning balloon in zero air drag using a rbfn based mesh-free method. Journal of the Textile Institute, 101(2), 101–110. doi:10.1080/00405000802273632
- Yin, R., & Gu, H. B. (2011). Numerical simulation of quasi-stationary ring spinning process linear elastic yarn. Textile Research Journal, 81(1), 22–27.
- Yuan, C., Jin, D., & Jin S. (1994). The theoretical research on ring spring frame balloon development equation. Journal of Hefei University of Technology (Natural Sciences), 17(3), 34–39.
- Zhang, W. S., Wu, W. Y., & Peng, Z. Z. (2007). On the yarn tension of balloon bottom after considering the effects of air-drag and Coriolis force. Journal of Donghua University (Natural Sciences), 33(6), 729–733.