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基于刀倾法的螺旋锥齿轮齿面误差修正算法研究 被引量:10

Research on Tooth Surface Deviation Correction Algorithm of Spiral Bevel Gear Based on Tilting Method
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摘要 针对螺旋锥齿轮齿面偏差识别方程的特点及采用最小二乘法求解此方程的不足,提出采用截断奇异值分解(TSVD)法与L曲线法进行求解,并且将此方法和最小二乘法进行了比较。研究表明:对小轮凹面,采用TSVD法与L曲线法,方程求解误差为0.051 571,而采用最小二乘法,方程求解误差为0.895 63;对小轮凸面,采用TSVD法与L曲线法,方程求解误差为0.043 882,而采用最小二乘法,方程求解误差为0.353 76。采用TSVD法与L曲线法求解此齿面偏差识别方程更精确,且得到的解都有意义。 According to the characteristics of the tooth surface deviation identification model of spiral bevel gear and defects of the least squares method solving,TSVD and the L curve method were proposed.The identification equation was solved to use TSVD and the L curve method and the least squares method separately.The research results show,to the concave,using TSVD and the L curve method,the equation solution error is 0.051 571,but using the least squares method,the equation solution error will be 0.895 63;to the convex,using TSVD and the L curve method,the equation solution error is 0.043 882,but using the least squares method,the equation solution error will be 0.353 76.Using TSVD and the L curve method this tooth surface deviation identification equation is solved more precisely,and the obtained solutions are meaningful.
作者 陈书涵 严宏志
机构地区 长沙理工大学 中南大学
出处 《中国机械工程》 EI CAS CSCD 北大核心 2011年第9期1080-1084,共5页 China Mechanical Engineering
基金 国家自然科学基金资助项目(50975291)
关键词 螺旋锥齿轮 齿面偏差 截断奇异值分解法 L曲线法 刀倾法 spiral bevel gear tooth surface's deviation truncated singular value decomposition(TSVD) L curve method tilting method
分类号 TH161 [机械工程—机械制造及自动化] TG596 [金属学及工艺—金属切削加工及机床]
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参考文献8

  • 1Stardtfeld H J. Handbook of Bevel and Hypoid Gears [M]. New York: Rochester Institute oI Technology, 1993.
  • 2Litvin F L, Zhang Y, Kieffer J, et al. Identification and Minimization of Deviations of Real Gear Tooth Surfaces[J]. Journal of Mechanical Design,ASME, 1991,113(1) :55-62.
  • 3Lin C Y, Tsay C B, Fong Z H. Computer--aided Manufacturing of Spiral Bevel and Hypoid Gears by Applying Optimization Techniques[J]. Journal of Materials Processing Technology, 2001,114 ( 1 ) : 22- 35.
  • 4Litvin F L. Gear Geometry and Applied Theory [M]. Upper Saddle River : Prentice Hall, 1994.
  • 5Hansen P C. Truncated Singular Decomposition Solutions to Discrete III- Posed Problems with III-- determined Numerieal Rank[J]. SIAM, J. Sei. Comput. ,1990,11(3) :503-518.
  • 6Hansen P C. The Use of the L-- curve in the Regularization of Discrete m -Posed Problems[J]. SIAM J. Sci. Comput. ,1993,14(6):1487-1503.
  • 7Hansen P C. Analysis of Discrete III --Posed Problems by Means of the L--curve[J]. SIAM Review, 1992,34 (4) :B61-580.
  • 8Litvin F L, Kuan C, Wang J C. Minimization of Deviations of Gear Real Tooth Surfaces Determined by Coordinate Measurements NASA CR- 4383 [R]. Springfield: US National Technical Information Serrice, 1992.

同被引文献66

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中国机械工程
2011年 第9期

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