Find minimum distance from point to complicated curve

I have a complicated curve defined as a set of points in a table like so (the full table is here):

``````#  x   y
1.0577  12.0914
1.0501  11.9946
1.0465  11.9338
...
``````

If I plot this table with the commands:

``````plt.plot(x_data, y_data, c='b',lw=1.)
plt.scatter(x_data, y_data, marker='o', color='k', s=10, lw=0.2)
``````

I get the following:

where I've added the red points and segments manually. What I need is a way to calculate those segments for each of those points, that is: a way to find the minimum distance from a given point in this 2D space to the interpolated curve.

I can't use the distance to the data points themselves (the black dots that generate the blue curve) since they are not located at equal intervals, sometimes they are close and sometimes they are far apart and this deeply affects my results further down the line.

Since this is not a well behaved curve I'm not really sure what I could do. I've tried interpolating it with a UnivariateSpline but it returns a very poor fit:

``````# Sort data according to x.
temp_data = zip(x_data, y_data)
temp_data.sort()
# Unpack sorted data.
x_sorted, y_sorted = zip(*temp_data)

# Generate univariate spline.
s = UnivariateSpline(x_sorted, y_sorted, k=5)
xspl = np.linspace(0.8, 1.1, 100)
yspl = s(xspl)

# Plot.
plt.scatter(xspl, yspl, marker='o', color='r', s=10, lw=0.2)
``````

I also tried increasing the number of interpolating points but got a mess:

``````# Sort data according to x.
temp_data = zip(x_data, y_data)
temp_data.sort()
# Unpack sorted data.
x_sorted, y_sorted = zip(*temp_data)

t = np.linspace(0, 1, len(x_sorted))
t2 = np.linspace(0, 1, 100)
# One-dimensional linear interpolation.
x2 = np.interp(t2, t, x_sorted)
y2 = np.interp(t2, t, y_sorted)
plt.scatter(x2, y2, marker='o', color='r', s=10, lw=0.2)
``````

Any ideas/pointers will be greatly appreciated.

-

If you're open to using a library for this, have a look at `shapely`: https://github.com/Toblerity/Shapely

As a quick example (`points.txt` contains the data you linked to in your question):

``````import shapely.geometry as geom
import numpy as np

line = geom.LineString(coords)
point = geom.Point(0.8, 10.5)

# Note that "line.distance(point)" would be identical
print point.distance(line)
``````

As an interactive example (this also draws the line segments you wanted):

``````import numpy as np
import shapely.geometry as geom
import matplotlib.pyplot as plt

class NearestPoint(object):
def __init__(self, line, ax):
self.line = line
self.ax = ax
ax.figure.canvas.mpl_connect('button_press_event', self)

def __call__(self, event):
x, y = event.xdata, event.ydata
point = geom.Point(x, y)
distance = self.line.distance(point)
self.draw_segment(point)
print 'Distance to line:', distance

def draw_segment(self, point):
point_on_line = line.interpolate(line.project(point))
self.ax.plot([point.x, point_on_line.x], [point.y, point_on_line.y],
color='red', marker='o', scalex=False, scaley=False)
fig.canvas.draw()

if __name__ == '__main__':

line = geom.LineString(coords)

fig, ax = plt.subplots()
ax.plot(*coords.T)
ax.axis('equal')
NearestPoint(line, ax)
plt.show()
``````

Note that I've added `ax.axis('equal')`. `shapely` operates in the coordinate system that the data is in. Without the equal axis plot, the view will be distorted, and while `shapely` will still find the nearest point, it won't look quite right in the display:

-
I don't know how I missed this answer until now. It is the most amazing answer I've gotten so far in StackOverflow. Not only did you answer my question, you showed me how to make an interactive plot. I can't thank you enough Joe. –  Gabriel Nov 26 '13 at 17:31
@Gabriel - Thanks! Glad to help! –  Joe Kington Nov 26 '13 at 19:05

The curve is by nature parametric, i.e. for each x there isn't necessary a unique y and vice versa. So you shouldn't interpolate a function of the form y(x) or x(y). Instead, you should do two interpolations, x(t) and y(t) where t is, say, the index of the corresponding point.

Then you use `scipy.optimize.fminbound` to find the optimal t such that (x(t) - x0)^2 + (y(t) - y0)^2 is the smallest, where (x0, y0) are the red dots in your first figure. For fminsearch, you could specify the min/max bound for t to be `1` and `len(x_data)`

-
Would you mind clarifying what `fminsearch` is? Also what you say about making two interpolations, one for x and one for y, wouldn't that be what I tried last in my question which gave me a mess? –  Gabriel Sep 30 '13 at 20:03
don't sort, the initial orders of x and y already in the right sequence. –  prgao Sep 30 '13 at 20:37
also it's 'fminbound', 'fminsearch' is a matlab equivalence. it finds the minimum of a scalar function between two specified bounds. see docs.scipy.org/doc/scipy/reference/generated/… –  prgao Sep 30 '13 at 20:46
The curve quite clearly presents discontinuities, I wouldn't interpolate at all, unless you are going to interpolate only within the non-discontinuous parts, and that's non-trivial to automate. –  gg349 Sep 30 '13 at 22:24

You could try implementing a calculation of distance from point to line on incremental pairs of points on the curve and finding that minimum. This will introduce a small bit of error from the curve as drawn, but it should be very small, as the points are relatively close together.

http://en.wikipedia.org/wiki/Distance_from_a_point_to_a_line

-
Moreover, the curve is only defined by the points, not by a specific interpolant of the points. So, unless we assume a specific interpolant function is the right one, we can't even discuss the error made. –  gg349 Sep 30 '13 at 20:25
Oh, good catch! Yeah, there is no particular error in this method, then. –  Vernepator Cur Sep 30 '13 at 20:57
I had the same idea, but actually it won't work: you must check that the projection of your point belongs to the line. But this may not happen in certain circumstances. Example: your point is just above a "hat" angled curve. Then the minimum distance would be between your point and the upper point of the hat, but you won't be able to find it by orthogonal distance to a line. –  jca Oct 1 '13 at 14:12
If the point on the line is closer than either of the two points in question, you should reject the distance. –  Vernepator Cur Oct 1 '13 at 14:29