# Extrapolation — awk based

I need help in the following: I have a data file (columns separated by "\t" tabular) like this `data.dat`

``````    # y1    y2      y3      y4
17.1685 21.6875 20.2393 26.3158
``````

These are x values of 4 points for a linear fit. The four y values are constant: `0, 200, 400, 600`.

I can create a linear fit of the point pairs `(x,y)`: `(x1,y1)=(17.1685,0), (x2,y2)=(21.6875,200), (x3,y3)=(20.2393,400), (x4,y4)=(26.3158,600)`.

Now I would like to make a linear fit on three of these point paris, `(x1,y1), (x2,y2), (x3,y3) and (x2,y2), (x3,y3), (x4,y4) and (x1,y1), (x3,y3), (x4,y4) and (x1,y1), (x2,y2), (x4,y4).`

If I have these three of points with a linear fit I would like to know the value of the x value of the extrapolated point being out of these three fitted points.

I have so far this awk code:

``````#!/usr/bin/awk -f

BEGIN{
z[1] = 0;
z[2] = 200;
z[3] = 400;
z[4] = 600;
}

{
split(\$0,str,"\t");
n = 0.0;

for(i=1; i<=NF; i++)
{
centr[i] = str[i];
n += 1.0;
# printf("%d\t%f\t%.1f\t",i,centr[i],z[i]);
}
# print "";

if (n > 2)
{
lsq(n,z,centr);
}
}

function lsq(n,x,y)
{
sx  = 0.0
sy  = 0.0
sxx = 0.0
syy = 0.0
sxy = 0.0
eps = 0.0

for (i=1;i<=n;i++)
{
sx  += x[i]
sy  += y[i]
sxx += x[i]*x[i]
sxy += x[i]*y[i]
syy += y[i]*y[i]
}

if ( (n==0) || ((n*sxx-sx*sx)==0) )
{
next;
}
#   print "number of data points = " n;
a = (sxx*sy-sxy*sx)/(n*sxx-sx*sx)
b = (n*sxy-sx*sy)/(n*sxx-sx*sx)

for(i=1;i<=n;i++)
{
ycalc[i] = a+b*x[i]
dy[i]    = y[i]-ycalc[i]
eps     += dy[i]*dy[i]
}

print "# Intercept =\t"a"
print "# Slope     =\t"b"

for (i=1;i<=n;i++)
{
printf("%8g %8g %8g \n",x[i],y[i],ycalc[i])
}

} # function lsq()
``````

So,

``````    If we extrapolate to the place of 4th
0   17.1685   <--(x1,y1)
200 21.6875   <--(x2,y2)
400 20.2393   <--(x3,y3)
600 22.7692 <<< (x4 = 600,y1 = 22.7692)

If we extrapolate to the place of 3th
0   17.1685   <--(x1,y1)
200 21.6875   <--(x2,y2)
400 23.6867 <<< (x3 = 400,y3 = 23.6867)
600 26.3158   <--(x4,y4)

0   17.1685
200 19.35266 <<<
400 20.2393
600 26.3158

0   18.1192 <<<
200 21.6875
400 20.2393
600 26.3158
``````

My current output is the following:

``````\$> ./prog.awk data.dat
# Intercept =   17.4537
# Slope     =   0.0129968
0  17.1685  17.4537
200  21.6875  20.0531
400  20.2393  22.6525
600  26.3158  25.2518
``````
-
Weren't the values of `y` constant? How did they get swapped? –  jaypal Jan 18 '12 at 14:22

Assuming the core calculation in the `lsq` function is OK (it looks about right, but I haven't scrutinized it), then that gives you the slope and intercept for the least sum of squares line of best fit for the input data set (parameters x, y, n). I'm not sure I understand the tail end of the function.

For your 'take three points and calculate the fourth' problem, the simplest way is to generate the 4 subsets (logically, by deleting one point from the set of four on each of four calls), and redo the calculation.

You need to call another function that takes the line data (slope, intercept) from `lsq` and interpolates (extrapolates) the value at another y value. That's a straight-forward calculation (`x = m * y + c`), but you need to determine which `y` value is missing from the set of 3 you pass in.

You could 'optimize' (meaning 'complicate') this scheme by dropping one value at a time from the 'sums of squares' and 'sums' and 'sum of products' values, recalculating the slope, intercept, and then calculating the missing point again.

(I'll also observe that normally it would be the x-coordinates with the fixed values 0, 200, 400, 600 and the y-coordinates would be the values read. However, that's just a matter of orientation, so it is not crucial.)

Here's at least plausibly working code. Since `awk` automatically splits on white space, there's no need for you to split on tabs specifically; the read loop takes this into account.

The code needs serious refactoring; there is a ton of repetition in it - however, I also have a job that I'm supposed to do.

``````#!/usr/bin/awk -f
BEGIN{
z[1] = 0;
z[2] = 200;
z[3] = 400;
z[4] = 600;
}

{
for (i = 1; i <= NF; i++)
{
centr[i] = \$i
}

if (NF > 2)
{
lsq(NF, z, centr);
}
}

function lsq(n, x, y)
{
if (n == 0) return

sx  = 0.0
sy  = 0.0
sxx = 0.0
syy = 0.0
sxy = 0.0

for (i = 1; i <= n; i++)
{
print "x[" i "] = " x[i] ", y[" i "] = " y[i]
sx  += x[i]
sy  += y[i]
sxx += x[i]*x[i]
sxy += x[i]*y[i]
syy += y[i]*y[i]
}

if ((n*sxx - sx*sx) == 0) return

#   print "number of data points = " n;
a = (sxx*sy-sxy*sx)/(n*sxx-sx*sx)
b = (n*sxy-sx*sy)/(n*sxx-sx*sx)

for (i = 1; i <= n; i++)
{
ycalc[i] = a+b*x[i]
}

print "# Intercept = " a
print "# Slope     = " b
print "Line: x = " a " + " b " * y"

for (i = 1; i <= n; i++)
{
printf("x = %8g, yo = %8g, yc = %8g\n", x[i], y[i], ycalc[i])
}

print ""
print "Different subsets\n"

for (drop = 1; drop <= n; drop++)
{
print "Subset " drop
sx = sy = sxx = sxy = syy = 0
j = 1
for (i = 1; i <= n; i++)
{
if (i == drop) continue
print "x[" j "] = " x[i] ", y[" j "] = " y[i]
sx  += x[i]
sy  += y[i]
sxx += x[i]*x[i]
sxy += x[i]*y[i]
syy += y[i]*y[i]
j++
}
if (((n-1)*sxx - sx*sx) == 0) continue
a = (sxx*sy-sxy*sx)/((n-1)*sxx-sx*sx)
b = ((n-1)*sxy-sx*sy)/((n-1)*sxx-sx*sx)
print "Line: x = " a " + " b " * y"

xt = x[drop]
yt = a + b * xt;
print "Interpolate: x = " xt ", y = " yt
}
}
``````

Since `awk` doesn't provide an easy way to pass back multiple values from a function, nor does it provide structures other than arrays (sometimes associative), it is not perhaps the best language for this task. On the other hand, it can be made to do the job. You might be able to bundle the Least Squares calculation in a function that returns an array containing the slope and intercept, and then use that. Your turn to explore options.

Given the script `lsq.awk` and the input file `lsq.data` shown, I get the output shown:

``````\$ cat lsq.data
17.1685 21.6875 20.2393 26.3158
\$ awk -f lsq.awk lsq.data
x[1] = 0, y[1] = 17.1685
x[2] = 200, y[2] = 21.6875
x[3] = 400, y[3] = 20.2393
x[4] = 600, y[4] = 26.3158
# Intercept = 17.4537
# Slope     = 0.0129968
Line: x = 17.4537 + 0.0129968 * y
x =        0, yo =  17.1685, yc =  17.4537
x =      200, yo =  21.6875, yc =  20.0531
x =      400, yo =  20.2393, yc =  22.6525
x =      600, yo =  26.3158, yc =  25.2518

Different subsets

Subset 1
x[1] = 200, y[1] = 21.6875
x[2] = 400, y[2] = 20.2393
x[3] = 600, y[3] = 26.3158
Line: x = 18.1192 + 0.0115708 * y
Interpolate: x = 0, y = 18.1192
Subset 2
x[1] = 0, y[1] = 17.1685
x[2] = 400, y[2] = 20.2393
x[3] = 600, y[3] = 26.3158
Line: x = 16.5198 + 0.0141643 * y
Interpolate: x = 200, y = 19.3526
Subset 3
x[1] = 0, y[1] = 17.1685
x[2] = 200, y[2] = 21.6875
x[3] = 600, y[3] = 26.3158
Line: x = 17.7985 + 0.0147205 * y
Interpolate: x = 400, y = 23.6867
Subset 4
x[1] = 0, y[1] = 17.1685
x[2] = 200, y[2] = 21.6875
x[3] = 400, y[3] = 20.2393
Line: x = 18.163 + 0.007677 * y
Interpolate: x = 600, y = 22.7692
\$
``````

Edit: In the previous version of the answer, the subsets were multiplying by `n` instead of `(n-1)`. The values in the revised output seem to agree with what you expect. The residual issues are presentational, not computational.

-
Yeah, this seems clear. But I could not implement it so far.. Could you help me to show what functions, and codes are you thinking about? Which part needs to be edited, and how? –  user1116360 Jan 18 '12 at 17:10
Hi, there is something wrong with the code you presented... Right in the first few rows of the output, for example the Line: x = 5.43577 + 0.0387496 * y is not correct..., it should be x = 18.1192 + 0.0115708 * y, shouldn't it? –  user1116360 Jan 19 '12 at 14:35
I have modified the post with the correct required output –  user1116360 Jan 19 '12 at 15:11
No, you misunderstood my explanation. I need the extrapolated values at a given x values which are not taken into account in the extrapolation –  user1116360 Jan 19 '12 at 15:38
You are entitled to do some of the thinking. You can either do another round of 'drop one from the list' work, or you can observe that two points define a line so you don't need least squares and can just do the basic arithmetic on each pair of input coordinates and calculate the results corresponding to the other x values. –  Jonathan Leffler Jan 19 '12 at 17:27