summary.lmList中的标准错误不是一个数字(NaN)
我正在使用summary.lmList中的标准错误不是一个数字(NaN),r,summary,standard-error,R,Summary,Standard Error,我正在使用nlme软件包中的Pixel数据,以适合具有lmList功能的型号: dat <- lmList(pixel ~ day+I(day^2)|Dog/Side, data=Pixel[Pixel$Dog != 9,], level=2) 对于Dog==10模型会精确地遍历每个数据点,从而导致NaN对于Std.Error可能错误非常小,无法打印。每个Dog有多少数据点/side@user20650对于Dog/Side,有不同数量的像素测量。对于Dog==10有3个度量。好的
nlmePixellmList dat <- lmList(pixel ~ day+I(day^2)|Dog/Side, data=Pixel[Pixel$Dog != 9,], level=2)
对于
Dog==10NaNStd.ErrorDog/Side像素测量。对于Dog==10
有3个度量。好的,谢谢-它们有什么奇怪的地方吗(非常大,很小,没有变化??。@user20650我手工计算出来的。对于pixel
的左侧和右侧测量,对于Dog==10
,模型精确地通过每个数据点,这导致Std.Error=0。谢谢你愿意帮忙!如果你有机会展示一下你是如何“亲自”检查的,那将非常感谢。我觉得我遇到了同样的问题,但我想确定一下:)@YohanObadia在这种情况下,方程如下:pixel=a+b1*天+b2*天^2,其中a是截距的估计系数,b1是天的估计系数,b2是天^2的估计系数(它们的值在系数表中可见)。因此,如果您尝试在第4天预测Dog==10
(10/R)右侧的像素值,它是:pixel=1056.6+16.1*4-1.625*4^2,您将在加载库(nlme)后通过打印pixel
,得到预测的像素值为1095。@YohanObadia
您将看到第4天狗==10的右侧的像素值是完全相同的。这意味着预测是完美的。
summary(dat)
Call:
Model: pixel ~ day + I(day^2) | Dog/Side
Level: 2
Data: Pixel[Pixel$Dog != 9, ]
Coefficients:
(Intercept)
Estimate Std. Error t value Pr(>|t|)
1/R 1045.349 6.436476 162.41015 0
2/R 1042.166 6.436476 161.91569 0
3/R 1046.265 7.853767 133.21825 0
4/R 1045.602 7.853767 133.13382 0
5/R 1110.309 27.576874 40.26231 0
6/R 1093.556 27.576874 39.65482 0
7/R 1156.478 30.223890 38.26369 0
8/R 1030.754 30.223890 34.10393 0
10/R 1056.600 NaN NaN NaN
1/L 1046.538 6.436476 162.59486 0
2/L 1050.367 6.436476 163.18985 0
3/L 1047.438 7.853767 133.36754 0
4/L 1050.915 7.853767 133.81027 0
5/L 1068.412 27.576874 38.74306 0
6/L 1089.184 27.576874 39.49630 0
7/L 1139.851 30.223890 37.71356 0
8/L 1086.129 30.223890 35.93611 0
10/L 1041.100 NaN NaN NaN
day
Estimate Std. Error t value Pr(>|t|)
1/R 0.21534820 2.600975 0.08279519 9.343899e-01
2/R 3.82436362 2.600975 1.47035789 1.485802e-01
3/R 8.59752235 1.698113 5.06298479 7.828854e-06
4/R 12.18801561 1.698113 7.17738612 6.287493e-09
5/R 4.91365979 6.709441 0.73235013 4.678382e-01
6/R -0.01159794 6.709441 -0.00172860 9.986286e-01
7/R 0.27908291 7.755457 0.03598536 9.714568e-01
8/R 14.20961055 7.755457 1.83220800 7.369405e-02
10/R 16.10000000 NaN NaN NaN
1/L 2.22308391 2.600975 0.85471187 3.973407e-01
2/L 3.31617525 2.600975 1.27497407 2.090100e-01
3/L 6.03985508 1.698113 3.55680313 9.127977e-04
4/L 12.48222079 1.698113 7.35064026 3.512296e-09
5/L 14.13427835 6.709441 2.10662542 4.088737e-02
6/L 7.22757732 6.709441 1.07722501 2.872506e-01
7/L -0.77719849 7.755457 -0.10021311 9.206304e-01
8/L 3.97248744 7.755457 0.51221835 6.110599e-01
10/L 30.60000000 NaN NaN NaN
I(day^2)
Estimate Std. Error t value Pr(>|t|)
1/R -0.0507392 0.1819114 -0.2789227 7.816110e-01
2/R -0.2228509 0.1819114 -1.2250523 2.270733e-01
3/R -0.3556849 0.0755204 -4.7097854 2.498505e-05
4/R -0.4708779 0.0755204 -6.2351082 1.522147e-07
5/R -0.3510125 0.3639863 -0.9643565 3.401377e-01
6/R -0.0880891 0.3639863 -0.2420122 8.098952e-01
7/R -0.1462626 0.4245106 -0.3445440 7.320786e-01
8/R -0.7429334 0.4245106 -1.7500941 8.707333e-02
10/R -1.6250000 NaN NaN NaN
1/L -0.1649267 0.1819114 -0.9066324 3.695397e-01
2/L -0.2135152 0.1819114 -1.1737319 2.468167e-01
3/L -0.2764050 0.0755204 -3.6600044 6.720231e-04
4/L -0.5425352 0.0755204 -7.1839551 6.150012e-09
5/L -0.8313144 0.3639863 -2.2839170 2.725859e-02
6/L -0.5060199 0.3639863 -1.3902170 1.714560e-01
7/L -0.1847048 0.4245106 -0.4351005 6.656163e-01
8/L -0.1878769 0.4245106 -0.4425729 6.602428e-01
10/L -1.9500000 NaN NaN NaN
Residual standard error: 8.820516 on 44 degrees of freedom