毕业论文论文范文课程设计实践报告法律论文英语论文教学论文医学论文农学论文艺术论文行政论文管理论文计算机安全
您现在的位置: 毕业论文 >> 英语论文 >> 正文

数控机床英文参考文献翻译 第3页

更新时间:2016-9-11:  来源:毕业论文
ξk+1 = ξk + ˙ ξ(tk)∆t +
a
where dots denote time derivatives. Now although ξ(t) is not known explicitly,
we can express its derivatives in terms of other (known) derivatives by noting
that, from the definitions of the parametric speed σ and feedrate V , derivatives
with respect to time t and the curve parameter ξ are related by

Applying this operator successively to ξ(t), we obtain the recursive formulae

etc., where primes indicate derivatives with respect to ξ. The parametric speed
σ and its derivatives, required in (29.5), can be expressed recursively as follows

etc. If the feedrate V is given as a function of a physically significant variable,
such as arc length, curvature, or time, derivatives with respect to that variable
must be transformed into derivatives with respect to ξ for use in (29.5).
In practice, the custom has typically been to retain only the linear term in
(29.3), with no attempt to estimate the truncation error, which may become
significant whenever the curvature is high and/or the parametric speed is low.
Improving the accuracy of this scheme by incorporating higher–order terms
may incur significant computational cost, since the coefficients of the quadratic
and subsequent terms become increasingly complicated in the case of variable
feedrates. Yang and Kong [475] first proposed a variable–feedrate interpolator,
based on a Taylor series truncated after the quadratic term. However, as noted
in [191], their expansion contains an erroneous quadratic term (valid only for a
constant feedrate, although a dependence on the curve parameter is explicitly
indicated). This error was subsequently repeated by Yeh and Hsu [477].
A systematic derivation of the correct Taylor coefficients, up to third order
in (29.3), was presented in [193] for the cases of constant feedrate and feedrates
dependent on time, arc length, or curvature. For a constant feedrate, we simply
set V 
= V 
= 0 in (29.5). For a time–dependent feedrate, the recursive forms

are most convenient for implementation. The case of a feedrate dependent on
arc length or curvature is more involved — details may be found in [193].
Taylor series interpolators inevitably incur truncation errors, through the
omission of higher–order terms in the series (29.3). Since each reference–point

上一页  [1] [2] [3] [4] [5] 下一页

数控机床英文参考文献翻译 第3页下载如图片无法显示或论文不完整,请联系qq752018766
设为首页 | 联系站长 | 友情链接 | 网站地图 |

copyright©youerw.com 优文论文网 严禁转载
如果本毕业论文网损害了您的利益或者侵犯了您的权利,请及时联系,我们一定会及时改正。