Abstract
As the approximation orders enlarge, the numerical algorithms of milling stability prediction are becoming increasingly complex with more and more calculation time being consuming. Above all, the effects of convergence and accuracy do not continuously improve for the presence of Runge phenomenon. This paper suggests a novel predictive scheme immune from this undesirable effect based on the Newton polynomial-Chebyshev nodes. Firstly, the processing dynamics embracing the self-excited vibration is described as the state-space equation with a separate time delay. Then n-order Newton polynomial with linear sampling nodes is chosen to unfold the monolithic non-homogeneous part to estimate the continuous response into linear discrete map, which designates the state transition of the system within a single cutting period. Taking advantage of this closed-form map, two coefficients that have considerable coupled elements with each other are established to generate the transition matrix, and the stability limits is searched out depending on Floquet theory. A set of comparisons are conducted using the experimentally validated examples to determine the optimal approximated order with exhibiting the features of the proposed methods. It is also disclosed that there is an obvious Runge effect existing in the presented high-order methods, which seriously lowers the estimated accuracy. In the interests of eliminating this unwanted effect, a nonlinear sampling technique based on Chebyshev nodes is adopted to substitute for the origin uniform time joints to establish a novel transition matrix with fewer calculated loads for the milling stability prediction, and the verifications illuminate the reconstituted methods are of satisfactory performance. The proposed methods are beneficial for the path planers to avoid some unsuited parameters which cause the machining chatter.
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References
Balachandran B, Zhao MX (2000) A mechanics based model for study of dynamics of milling operations. Meccanica 35(2):89–109
Wiercigroch M, Balachandran B (2001) Nonlinear dynamics of milling processes. Phil Trans R Soc A 359:793–819
Dai Y, Li H, Wei Z, Zhang H (2018) Chatter stability prediction for five-axis ball end milling with precise integration method. J Manuf Process 32:20–31
Balachandran B, Gilsinn D (2005) Non-linear oscillations of milling. Math Comp Model Dyn 11(3):273–290
Long XH, Balachandran B (2007) Stability analysis for milling process. Nonlinear Dynam 49(3):349–359
Dai Y, Li H, Dong J, Zhou Q, Yong J, Liu S (2019) An updated model of stability prediction in five-axis ball-end milling. Int J Adv Manuf Technol 103(9):3293–3306
Yang W, Huang C, Cai X, You Y (2020) Effective and fast prediction of milling stability using a precise integration-based third-order full-discretization method. Int J Adv Manuf Technol 106(9):4477–4498
Zhi H, Zhang T, Du J, Yan X (2020) An efficient full-discretization method for milling stability prediction. Int J Adv Manuf Technol 107(11):4955–4967
Yan Z, Zhang C, Jiang X, Ma B (2020) Comparison of the full-discretization methods for milling stability analysis by using different high-order polynomials to interpolate both state term and delayed term. Int J Adv Manuf Technol 108(1):571–588
Wu Y, You Y, Liu A, Deng B, Liu W (2020) An implicit exponentially fitted method for chatter stability prediction of milling processes. Int J Adv Manuf Technol 106(5):2189–2204
Ma H, Wu J, Xiong Z (2020) Active chatter control in turning processes with input constraint. Int J Adv Manuf Technol 108(11):3737–3751
Dai Y, Li H, Yao J, Liu S (2019) A novel approach with time-invariant transition matrix for surface location error prediction in low radial immersion milling. Int J Adv Manuf Technol 101(5):1267–1274
Altintaş Y, Budak E (1995) Analytical prediction of stability lobes in milling. CIRP Ann Manuf Technol 44(1):357–362
Altintaş Y, Shamoto E, Lee P, Budak E (1999) Analytical prediction of stability lobes in ball end milling. J Manuf Sci E-T ASME 121(4):586–592
Merdol SD, Altintas Y (2004) Multi frequency solution of chatter stability for low immersion milling. J Manuf Sci E-T ASME 126(3):459–466
Shamoto E, Akazawa K (2009) Analytical prediction of chatter stability in ball end milling with tool inclination. CIRP Ann Manuf Technol 58(1):351–354
Sun C, Altintas Y (2016) Chatter free tool orientations in 5-axis ball-end milling. Int J Mach Tool Manu 106:89–97
Ozturk E, Budak E (2010) Dynamics and stability of five-axis ball-end milling. J Manuf Sci E-T ASME 132(2):237–247
Ozturk E, Tunc LT, Budak E (2009) Investigation of lead and tilt angle effects in 5-axis ball-end milling processes. Int J Mach Tool Manu 49(14):1053–1062
Bayly PV, Mann BP, Schmitz TL et al (2002) Effects of radial immersion and cutting direction on chatter instability in end-milling. ASME 2002 Int Mech Eng C Exp 3 641:351–363
Mann BP, Young KA, Schmitz TL, Dilley DN (2004) Simultaneous stability and surface location error predictions in milling. J Manuf Sci E-T ASME 127(3):446–453
Insperger T, Stépán G (2002) Semi-discretization method for delayed systems. Int J Numer Methods Eng 55(5):503–518
Insperger T, Stépán G (2004) Updated semi-discretization method for periodic delay-differential equations with discrete delay. Int J Numer Methods Eng 61(1):117–141
Insperger T, Stépán G, Turi J (2015) On the higher-order semi-discretizations for periodic delayed systems. J Sound Vib 313(1):334–341
Zhong W (2004) On precise integration method. J Comput Appl Math 163(1):59–78
Zhong W, Williams FW (1994) A precise time step integration method. P I Mech Eng C-J Mec 208(6):427–430
Ding Y, Zhu LM, Zhang XJ, Ding H (2010) A full-discretization method for prediction of milling stability. Int J Mach Tool Manu 50(5):502–509
Insperger T (2010) Full-discretization and semi-discretization for milling stability prediction: some comments. Int J Mach Tool Manu 50(7):658–662
Cao L, Zhang X, Huang T, Ding H (2018) Derived nodes approach for improving accuracy of machining stability prediction. J Vib Acoust 140(3):31017
Dai Y, Li H, Hao B (2018) An improved full-discretization method for chatter stability prediction. Int J Adv Manuf Technol 96(9-12):3503–3510
Huang T, Zhang X, Zhang X, Ding H (2013) An efficient linear approximation of acceleration method for milling stability prediction. Int J Mach Tool Manu 74:56–64
Dong X, Zhang W (2019) Chatter suppression analysis in milling process with variable spindle speed based on the reconstructed semi-discretization method. Int J Adv Manuf Technol 105(5):2021–2037
Wang C, Zhang X, Yan R, Chen X, Cao H (2019) Multi harmonic spindle speed variation for milling chatter suppression and parameters optimization. Precis Eng 55:268–274
Long X, Balachandran B (2010) Stability of up-milling and down-milling operations with variable spindle speed. J Vib Control 16:1151–1168
Long X, Insperger T, Balachandran B (2009) Systems with periodic coefficients and periodically varying delays: Semidiscretization-Based stability analysis Boston. Springer US, MA, pp 131–153
Li M, Zhang G, Huang Y (2013) Complete discretization scheme for milling stability prediction. Nonlinear Dynam 71(1-2):187–199
Dai Y, Li H, Xing X, Hao B (2018) Prediction of chatter stability for milling process using precise integration method. Precis Eng 52:152–157
Li H, Dai Y, Fan Z (2019) Improved precise integration method for chatter stability prediction of two-DOF milling system. Int J Adv Manuf Technol 101(5):1235–1246
Ding Y, Zhu L, Zhang X, Ding H (2010) Second-order full-discretization method for milling stability prediction. Int J Mach Tool Manu 50(10):926–932
Liu Y, Zhang D, Wu B (2012) An efficient full-discretization method for prediction of milling stability. Int J Mach Tool Manu 63(3):44–48
Ozoegwu CG, Omenyi SN, Ofochebe SM (2015) Hyper-third order full-discretization methods in milling stability prediction. Int J Mach Tool Manu 92:1–9
Tang X, Peng F, Rong Y, Gong Y, Li Y, Jiang L (2017) Accurate and efficient prediction of milling stability with updated full-discretization method. Int J Adv Manuf Technol 88(9-12):2357–2368
Yan Z, Wang X, Liu Z, Wang D, Jiao L, Ji Y (2017) Third-order updated full-discretization method for milling stability prediction. Int J Adv Manuf Technol 92(5-8):2299–2309
Ding Y, Zhu L, Zhang X, Ding H (2011) Numerical integration method for prediction of milling stability. J Manuf Sci E-T ASME 133(3):31005
Zhang Z, Li H, Meng G, Liu C (2015) A novel approach for the prediction of the milling stability based on the Simpson method. Int J Mach Tool Manu 99:43–47
Bayly PV, Mann BP, Schmitz TL et al (2002) Effects of radial immersion and cutting direction on chatter instability in end-milling. Int Mech Eng C Exp ASME 3641:351–363
Acknowledgments
The authors are very grateful for the support of Major Science and Technology Projects in Liaoning Province (2019JH1/10100019), National Natural Science Foundation of China (U1808214), National Key R & D Program of China (2019YFB2004600), and Fundamental Research Funds for the Dalian University of Technology (DUT20LAB125).
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Dai, Y., Li, H., Yang, G. et al. A novel method with Newton polynomial-Chebyshev nodes for milling stability prediction. Int J Adv Manuf Technol 112, 1373–1387 (2021). https://doi.org/10.1007/s00170-020-06090-3
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DOI: https://doi.org/10.1007/s00170-020-06090-3