Riffing off of @James example
p <- qplot(hp,wt,data=mtcars) + stat_smooth()
You can use the intermediate stages of the ggplot building process to pull out the plotted data. The results of ggplot_build
is a list, one component of which is data
which is a list of dataframes which contain the computed values to be plotted. In this case, the list is two dataframes since the original qplot
creates one for points and the stat_smooth
creates a smoothed one.
> ggplot_build(p)$data[[2]]
geom_smooth: method="auto" and size of largest group is <1000, so using loess. Use 'method = x' to change the smoothing method.
x y ymin ymax se PANEL group
1 52.00000 1.993594 1.149150 2.838038 0.4111133 1 1
2 55.58228 2.039986 1.303264 2.776709 0.3586695 1 1
3 59.16456 2.087067 1.443076 2.731058 0.3135236 1 1
4 62.74684 2.134889 1.567662 2.702115 0.2761514 1 1
5 66.32911 2.183533 1.677017 2.690049 0.2465948 1 1
6 69.91139 2.232867 1.771739 2.693995 0.2244980 1 1
7 73.49367 2.282897 1.853241 2.712552 0.2091756 1 1
8 77.07595 2.333626 1.923599 2.743652 0.1996193 1 1
9 80.65823 2.385059 1.985378 2.784740 0.1945828 1 1
10 84.24051 2.437200 2.041282 2.833117 0.1927505 1 1
11 87.82278 2.490053 2.093808 2.886297 0.1929096 1 1
12 91.40506 2.543622 2.145018 2.942225 0.1940582 1 1
13 94.98734 2.597911 2.196466 2.999355 0.1954412 1 1
14 98.56962 2.652852 2.249260 3.056444 0.1964867 1 1
15 102.15190 2.708104 2.303465 3.112744 0.1969967 1 1
16 105.73418 2.764156 2.357927 3.170385 0.1977705 1 1
17 109.31646 2.821771 2.414230 3.229311 0.1984091 1 1
18 112.89873 2.888224 2.478136 3.298312 0.1996493 1 1
19 116.48101 2.968745 2.531045 3.406444 0.2130917 1 1
20 120.06329 3.049545 2.552102 3.546987 0.2421773 1 1
21 123.64557 3.115893 2.573577 3.658208 0.2640235 1 1
22 127.22785 3.156368 2.601664 3.711072 0.2700548 1 1
23 130.81013 3.175495 2.625951 3.725039 0.2675429 1 1
24 134.39241 3.181411 2.645191 3.717631 0.2610560 1 1
25 137.97468 3.182252 2.658993 3.705511 0.2547460 1 1
26 141.55696 3.186155 2.670350 3.701961 0.2511175 1 1
27 145.13924 3.201258 2.687208 3.715308 0.2502626 1 1
28 148.72152 3.235698 2.721744 3.749652 0.2502159 1 1
29 152.30380 3.291766 2.782767 3.800765 0.2478037 1 1
30 155.88608 3.353259 2.857911 3.848607 0.2411575 1 1
31 159.46835 3.418409 2.938257 3.898561 0.2337596 1 1
32 163.05063 3.487074 3.017321 3.956828 0.2286972 1 1
33 166.63291 3.559111 3.092367 4.025855 0.2272319 1 1
34 170.21519 3.634377 3.165426 4.103328 0.2283065 1 1
35 173.79747 3.712729 3.242093 4.183364 0.2291263 1 1
36 177.37975 3.813399 3.347232 4.279565 0.2269509 1 1
37 180.96203 3.910849 3.447572 4.374127 0.2255441 1 1
38 184.54430 3.977051 3.517784 4.436318 0.2235917 1 1
39 188.12658 4.037302 3.583959 4.490645 0.2207076 1 1
40 191.70886 4.091635 3.645111 4.538160 0.2173882 1 1
41 195.29114 4.140082 3.700184 4.579981 0.2141624 1 1
42 198.87342 4.182676 3.748159 4.617192 0.2115424 1 1
43 202.45570 4.219447 3.788162 4.650732 0.2099688 1 1
44 206.03797 4.250429 3.819579 4.681280 0.2097573 1 1
45 209.62025 4.275654 3.842137 4.709171 0.2110556 1 1
46 213.20253 4.295154 3.855951 4.734357 0.2138238 1 1
47 216.78481 4.308961 3.861497 4.756425 0.2178456 1 1
48 220.36709 4.317108 3.859541 4.774675 0.2227644 1 1
49 223.94937 4.319626 3.851025 4.788227 0.2281358 1 1
50 227.53165 4.316548 3.836964 4.796132 0.2334829 1 1
51 231.11392 4.308435 3.818728 4.798143 0.2384117 1 1
52 234.69620 4.302276 3.802201 4.802351 0.2434590 1 1
53 238.27848 4.297902 3.787395 4.808409 0.2485379 1 1
54 241.86076 4.292303 3.772103 4.812503 0.2532567 1 1
55 245.44304 4.282505 3.754087 4.810923 0.2572576 1 1
56 249.02532 4.269040 3.733184 4.804896 0.2608786 1 1
57 252.60759 4.253361 3.710042 4.796680 0.2645121 1 1
58 256.18987 4.235474 3.684476 4.786473 0.2682509 1 1
59 259.77215 4.215385 3.656265 4.774504 0.2722044 1 1
60 263.35443 4.193098 3.625161 4.761036 0.2764974 1 1
61 266.93671 4.168621 3.590884 4.746357 0.2812681 1 1
62 270.51899 4.141957 3.553134 4.730781 0.2866658 1 1
63 274.10127 4.113114 3.511593 4.714635 0.2928472 1 1
64 277.68354 4.082096 3.465939 4.698253 0.2999729 1 1
65 281.26582 4.048910 3.415849 4.681971 0.3082025 1 1
66 284.84810 4.013560 3.361010 4.666109 0.3176905 1 1
67 288.43038 3.976052 3.301132 4.650972 0.3285813 1 1
68 292.01266 3.936392 3.235952 4.636833 0.3410058 1 1
69 295.59494 3.894586 3.165240 4.623932 0.3550782 1 1
70 299.17722 3.850639 3.088806 4.612473 0.3708948 1 1
71 302.75949 3.804557 3.006494 4.602619 0.3885326 1 1
72 306.34177 3.756345 2.918191 4.594499 0.4080510 1 1
73 309.92405 3.706009 2.823813 4.588205 0.4294926 1 1
74 313.50633 3.653554 2.723308 4.583801 0.4528856 1 1
75 317.08861 3.598987 2.616650 4.581325 0.4782460 1 1
76 320.67089 3.542313 2.503829 4.580796 0.5055805 1 1
77 324.25316 3.483536 2.384853 4.582220 0.5348886 1 1
78 327.83544 3.422664 2.259739 4.585589 0.5661643 1 1
79 331.41772 3.359701 2.128512 4.590891 0.5993985 1 1
80 335.00000 3.294654 1.991200 4.598107 0.6345798 1 1
Knowing a priori where the one you want is in the list isn't easy, but if nothing else you can look at the column names.
It is still better to do the smoothing outside the ggplot
call, though.
EDIT:
It turns out replicating what ggplot2
does to make the loess
is not as straightforward as I thought, but this will work. I copied it out of some internal functions in ggplot2
.
model <- loess(wt ~ hp, data=mtcars)
xrange <- range(mtcars$hp)
xseq <- seq(from=xrange[1], to=xrange[2], length=80)
pred <- predict(model, newdata = data.frame(hp = xseq), se=TRUE)
y = pred$fit
ci <- pred$se.fit * qt(0.95 / 2 + .5, pred$df)
ymin = y - ci
ymax = y + ci
loess.DF <- data.frame(x = xseq, y, ymin, ymax, se = pred$se.fit)
ggplot(mtcars, aes(x=hp, y=wt)) +
geom_point() +
geom_smooth(aes_auto(loess.DF), data=loess.DF, stat="identity")
That gives a plot that looks identical to
ggplot(mtcars, aes(x=hp, y=wt)) +
geom_point() +
geom_smooth()
(which is the expanded form of the original p
).