Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I've searched around on this forum but couldn't find any suitable answer.

I'm trying to fit data using the lm() function in R.

I'm return some NAs values for some coefficients as I increase the order of the regression.

I don't get any singularity warning.

Can anyone help me to interpret these NAs, please?

I add that I reproduced this example in Excel, and there is no obvious problem with a 6th-order fitting.

# Data to be fitted
stock <- c(489197.2129,495385.3703,544941.481,481155.2393,435762.9306,357146.5142,356185.969,368933.2469,293205.1993,247441.8927,183643.7369,166197.9676,157520.3711,192794.255,233347.9248,284770.2749,315789.5782,371253.6707,390370.26,391904.2643,404514.2993,389401.9623,422098.5764,416199.1896,308483.5621,369373.6144,279512.2105,229390.7449,265094.0731,254002.6063,283473.7341,303136.1179,463795.7419,609924.3831,656716.8011,764936.5351,920655.356,944580.607,946031.8681,923518.1477,764901.8927,718968.5814,687068.9807,638677.6326,566646.849,568238.4514,568861.9136,507755.2549,501554.6739,477044.9342,495936.671,463228.2127,453138.3738,480070.4041,545712.6657,577885.5442,611762.2815,601142.7448,514746.6677,461110.9112,380481.1653,386708.9577,387533.3888,387386.6938,410659.1991,556877.152,645031.3825,658208.7034,630659.5014,694707.3162,742454.1986,714466.0588,711948.193,794587.0558,720513.7768,637774.9029,612416.9054,675275.3033,748426.8297,798275.4601,809230.2204,887963.61,976844.1755,951519.2965,984227.0611,1031613.419,1022424.077,954223.6635,955542.5767,920263.327,915265.1223,894546.0728,863364.3203,787588.1825,676158.8976,645554.3779,623867.4582,665281.1634,687277.3358,664088.3827,664183.8062,565105.7676,647452.9797,692280.0696,752396.7808,802440.2146,745383.8062,617119.624,574357.2181,508957.1325,532442.9542,581061.2421,525361.6981,445030.5886,500392.6723,562968.2406,604250.7148,595129.1082,612276.0135,592986.8004,521539.9552,462458.0483,506952.8987,566760.636,652918.6488,735203.327,734013.0201,853466.4269,944496.4215,970809.8151,986741.7525,1051128.913,935281.5542,734450.0057,648969.2357,561200.8083,522026.9359,525941.5821,483971.0487,509913.9941,577511.4155,623777.4897,594309.4065,673049.2068,792564.841,717606.1748,769882.0247,757618.8126,649915.7552,637335.348,643047.1521,584827.5927,594986.2344,616484.6346,682519.916,771948.7174,810259.8153,729710.4213,755624.5028,792269.7553,821344.8099,865256.8204,810055.8891,818226.3348,823462.5172,833754.4351,817210.9106,713206.5412,682863.4516,725996.9946,759555.3406,814912.3816,832986.6209,901940.123,842127.3124,844281.6881,835065.4434,898115.2783,969897.5776,864050.6036,700239.783,740024.1581,688177.6953,720837.362,746235.722,776414.6042,801468.2772,687190.4567,661752.5449,575210.847,657086.9557,741170.8837,667119.5521,716576.0049,798851.6401,925529.028,1113095.162,1170901.816,1245123.324,1118704.034,1112237.559,1077526.324,1071058.372,1056817.839,1170688.049,1147460.898,1034460.346,1103695.303,1237298.977,1158263.736,1152377.973,1216425.62,1259507.168,1230094.739,1303810.435,1271821.888,1489379.948,1497456.885,1373050.412,1354787.605,1361778.393,1153284.081,970091.4123,907278.7659,1119405.724,1167833.909,1106640.238,1089461.159,1227331.968,1291666.639,1286147.056,1206958.849,1067637.209,1020742.997,1011014.154,1115106.152,1057974.568,1056812.59,1058939.012,1020221.806,1077736.49,1110610.504,1110008.193,1114165.552,1088981.295,1112743.615,1090191.485,1035041.804,897884.0154,764819.8401,786705.2071,1047239.939,1041620.036,989888.0243,1052172.174,1142759.928,1202770.868,1354842.679,1386464.631,1284428.757,1227429.952,1191119.178,1220788.93,1337429.916,1484401.276,1541650.876,1578366.413,1696235.083,1487447.482,1326801.659,1366593.384,1377946.19,1322450.948,1306874.043,1368784.977,1439783.001,1511648.674,1652885.159,1744426.741,1730925.901,1808393.081,1842413.869,1695196.299,1716413.086,1656757.555,1391727.704,1431662.545,1352510.013,1445729.796,1498989.601,1468584.044,1355810.704,1283381.625,1341633.292,1401430.509,1479601.908,1345554.608,1360708.621,1547755.19,1510224.416,1836147.717,1933498.647,2003248.251,2039134.04,2197176.515,2273953.329,2119725.123,1883806.835,1796551.502,1826188.718,1937247.67,1790714.402,1797054.648,1570424.416,1499444.414,1472217.319,1574409.675,1576654.181,1428669.458,1443278.681,1453978.398,1724129.787,1653824.594,2010251.997,1964806.887,1795767.829,1819998.743,1848646.139,1795693.654,1626176.807,1510686.457,1742119.961,1577922.47,1568274.698,1399547.138,1450947.192,1390710.466,1485740.833,1772374.119,1903548.298,2207850.281,2297201.405,2153285.523,1935798.325,1991630.36,1861421.8,1792542.838,1846899.839,1981351.805,2068061.716,2148654.112,2108554.414,2050596.262,1899675.419,2142982.747,2152816.563,2284118.374,2187483.675,2193354.528,2358717.33,2528072.391,2451283.945)
# Produce dates from Jan 1983 to Feb 2013
t <- seq(1983.1, 2013.2, length = length(stock))
# Fit Xt =  alpha0 + alpha1^2 + alpha2^3 + alpha3^4 + alpha4^5 + alpha5^6 + eps.
lm(stock ~ poly(t, 6, raw=TRUE))

Result:

 Call:
  lm(formula = stock ~ poly(t, 6, raw = TRUE))

Coefficients:
        (Intercept)  poly(t, 6, raw = TRUE)1  poly(t, 6, raw = TRUE)2  
         -3.929e+11                5.265e+08               -1.984e+05  
poly(t, 6, raw = TRUE)3  poly(t, 6, raw = TRUE)4  poly(t, 6, raw = TRUE)5  
                 NA                8.352e-03                       NA  
poly(t, 6, raw = TRUE)6  
                 NA  
share|improve this question
2  
I do get singularity indication, but only when I use summary() on the fit object. –  ndoogan May 6 '13 at 15:48
    
Ah yes, you're right. I expect singularities warnings (something I read about in other forums) would read right by calling the lm() function, without having to use the summary() function. –  edouard May 6 '13 at 15:52
    
And, then what can I conclude from this? How to cope? –  edouard May 6 '13 at 15:53

1 Answer 1

up vote 4 down vote accepted

Using raw=TRUE defeats the purpose of the poly function, which is to avoid the collinearity problems that arise with the use of the high-school version of polynomial fit that we were taught when we were young. If you want a more complex polynomial fit to that data, then drop the raw=TRUE:

lm(stock ~ poly(t, 6)) 

Call:
lm(formula = stock ~ poly(t, 6))

Coefficients:
(Intercept)  poly(t, 6)1  poly(t, 6)2  poly(t, 6)3  poly(t, 6)4  poly(t, 6)5  
    1030800      8866278      2217055       724873      -611351       580051  
poly(t, 6)6  
     721027  

plot(t, stock)
lines(t, predict(lm(stock ~ poly(t, 6, raw=TRUE)) ) )
lines(t, predict(lm(stock ~ poly(t, 6)) ) , col="red", lwd=3)

enter image description here

share|improve this answer
    
Fantastic! Thanks DWIN. –  edouard May 6 '13 at 17:06

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.