Find Point in polygon PHP

i have a typical question with the Geometric datatype of mysql, polygon.

I have the polygon data, in the form of an array of latitudes and longitudes, ex:

``````[["x":37.628134,  "y":-77.458334],
["x":37.629867,   "y":-77.449021],
["x":37.62324,    "y":-77.445416],
["x":37.622424,   "y":-77.457819]]
``````

And i have a point (Vertex) with coordinates of latitude and longitude, ex:

``````\$location = new vertex(\$_GET["longitude"], \$_GET["latitude"]);
``````

Now i want to find whether this vertex (point) is inside the polygon. How can i do this in php ?

-
Is your polygon guaranteed to be convex? –  awm Feb 21 '11 at 10:52
Oooh, cool, what are you making? –  user479911 Feb 21 '11 at 10:53
I dont know whether it is convex or concave, basically iam forming a polygon with a set of vertices, that represent the latitudes and longitudes of a particular geographic place. And i want to find whether a geometric point (vertex) is inside a polygon. –  shasi kanth Feb 21 '11 at 10:55
There's an excellent explanation of how to do this in the answer to stackoverflow.com/questions/217578/… with code that could easily be ported to PHP –  Mark Baker Feb 21 '11 at 11:06

This is a function i converted from another language into PHP:

``````\$vertices_x = array(37.628134, 37.629867, 37.62324, 37.622424);    // x-coordinates of the vertices of the polygon
\$vertices_y = array(-77.458334,-77.449021,-77.445416,-77.457819); // y-coordinates of the vertices of the polygon
\$points_polygon = count(\$vertices_x) - 1;  // number vertices - zero-based array
\$longitude_x = \$_GET["longitude"];  // x-coordinate of the point to test
\$latitude_y = \$_GET["latitude"];    // y-coordinate of the point to test

if (is_in_polygon(\$points_polygon, \$vertices_x, \$vertices_y, \$longitude_x, \$latitude_y)){
echo "Is in polygon!";
}
else echo "Is not in polygon";

function is_in_polygon(\$points_polygon, \$vertices_x, \$vertices_y, \$longitude_x, \$latitude_y)
{
\$i = \$j = \$c = 0;
for (\$i = 0, \$j = \$points_polygon ; \$i < \$points_polygon; \$j = \$i++) {
if ( ((\$vertices_y[\$i]  >  \$latitude_y != (\$vertices_y[\$j] > \$latitude_y)) &&
(\$longitude_x < (\$vertices_x[\$j] - \$vertices_x[\$i]) * (\$latitude_y - \$vertices_y[\$i]) / (\$vertices_y[\$j] - \$vertices_y[\$i]) + \$vertices_x[\$i]) ) )
\$c = !\$c;
}
return \$c;
}
``````

Additional: For more functions i advise you to use the polygon.php class available here. Create the Class using your vertices and call the function `isInside` with your testpoint as input to have another function solving your problem.

-
+1 - And visit ecse.rpi.edu/Homepages/wrf/Research/Short_Notes/pnpoly.html for an explanation of how it works –  Mark Baker Feb 21 '11 at 11:17
Thanks these links helped me out. –  shasi kanth Feb 21 '11 at 11:20
Also found another working example here: assemblysys.com/dataServices/php_pointinpolygon.php –  shasi kanth Feb 21 '11 at 14:25
This algorithm is quite good for cases when polygon's Xs and Ys are all positive but since question is about latitude and longitude: is it just me or this algorithm will fail spectacularly if polygon is crossed by greenwich meridian, i.e. one point has positive longitude like 1.000000 and the next one has negative like -1.000000? Possible solution: offset all longitudes with +180 (this is not moving east to China where math operations are cheaper but to make all longitudes positive :-) ) –  Ogre_BGR Dec 28 '11 at 19:00
Does this algorythm assume that the polygon is not self-closing? That is to say that it's final vertex is the line between it's penultimate point and it's last point. And not the line between the last point and it's first point as is the case with a self-closing polygon. Note: I am using this to work with SVGs –  Martin Joiner Oct 4 '13 at 15:45

The popular answer above contains typos. Elsewhere, this code has been cleaned up. The corrected code is as follows:

``````<?php
/**
Also see http://en.wikipedia.org/wiki/Point_in_polygon
*/
\$vertices_x = array(37.628134, 37.629867, 37.62324, 37.622424); // x-coordinates of the vertices of the polygon
\$vertices_y = array(-77.458334,-77.449021,-77.445416,-77.457819); // y-coordinates of the vertices of the polygon
\$points_polygon = count(\$vertices_x); // number vertices
\$longitude_x = \$_GET["longitude"]; // x-coordinate of the point to test
\$latitude_y = \$_GET["latitude"]; // y-coordinate of the point to test
//// For testing.  This point lies inside the test polygon.
// \$longitude_x = 37.62850;
// \$latitude_y = -77.4499;

if (is_in_polygon(\$points_polygon, \$vertices_x, \$vertices_y, \$longitude_x, \$latitude_y)){
echo "Is in polygon!";
}
else echo "Is not in polygon";

function is_in_polygon(\$points_polygon, \$vertices_x, \$vertices_y, \$longitude_x, \$latitude_y)
{
\$i = \$j = \$c = 0;
for (\$i = 0, \$j = \$points_polygon-1 ; \$i < \$points_polygon; \$j = \$i++) {
if ( ((\$vertices_y[\$i] > \$latitude_y != (\$vertices_y[\$j] > \$latitude_y)) &&
(\$longitude_x < (\$vertices_x[\$j] - \$vertices_x[\$i]) * (\$latitude_y - \$vertices_y[\$i]) / (\$vertices_y[\$j] - \$vertices_y[\$i]) + \$vertices_x[\$i]) ) )
\$c = !\$c;
}
return \$c;
}
?>
``````
-
This function works pretty good, but it will not work if the test point is equal to one of the vertices. This is a simple test case to add. Also, you have to take care that your polygons do not cross the international dateline. If you need to do this, you must decompose the polygon into two polygons on either side. –  Jake May 19 '12 at 3:12
What specific typos did you correct? As far as I can see all you have done is moved the `-1` from outside the `is_in_polygon()` function to inline. –  Martin Joiner Oct 4 '13 at 15:41
As originally provided the code didn't parse correctly. It seems to have been fixed since (edited after my answer). See here: stackoverflow.com/posts/5065219/revisions –  amh15 Dec 3 '14 at 22:44

Here's a possible algorithm.

1. Define a new coordinate system with your point of interest at the center.
2. In your new coordinate system, convert all of your polygon vertices into polar coordinates.
3. Traverse the polygon, keeping track of the net change in angle, ∆θ. Always use the smallest possible value for each change in angle.
4. If, once you've traversed the polygon, your total ∆θ is 0, then you're outside the polygon. On the other hand, if it's is ±2π, then you're inside.
5. If, by chance ∆θ>2π or ∆θ<-2π, that means you have a polygon that doubles back on itself.

Writing the code is left as an exercise. :)

-
Sorry, but i could not understand the scenario... it looks very complex. Any example code or link ? –  shasi kanth Feb 21 '11 at 11:02
There's probably a library of complicated math functions somewhere. Perhaps someone else knows where it is (I don't). My answer is only useful if you're going to write the code yourself. :) –  awm Feb 21 '11 at 11:07

If your polygons are self-closing, that is to say that it's final vertex is the line between it's last point and it's first point then you need to add a variable and a condition to your loop to deal with the final vertex. You also need to pass the number of vertices as being equal to the number of points.

Here is the accepted answer modified to deal with self-closing polygons:

``````\$vertices_x = array(37.628134, 37.629867, 37.62324, 37.622424);    // x-coordinates of the vertices of the polygon
\$vertices_y = array(-77.458334,-77.449021,-77.445416,-77.457819); // y-coordinates of the vertices of the polygon
\$points_polygon = count(\$vertices_x);  // number vertices = number of points in a self-closing polygon
\$longitude_x = \$_GET["longitude"];  // x-coordinate of the point to test
\$latitude_y = \$_GET["latitude"];    // y-coordinate of the point to test

if (is_in_polygon(\$points_polygon, \$vertices_x, \$vertices_y, \$longitude_x, \$latitude_y)){
echo "Is in polygon!";
}
else echo "Is not in polygon";

function is_in_polygon(\$points_polygon, \$vertices_x, \$vertices_y, \$longitude_x, \$latitude_y)
{
\$i = \$j = \$c = \$point = 0;
for (\$i = 0, \$j = \$points_polygon ; \$i < \$points_polygon; \$j = \$i++) {
\$point = \$i;
if( \$point == \$points_polygon )
\$point = 0;
if ( ((\$vertices_y[\$point]  >  \$latitude_y != (\$vertices_y[\$j] > \$latitude_y)) &&
(\$longitude_x < (\$vertices_x[\$j] - \$vertices_x[\$point]) * (\$latitude_y - \$vertices_y[\$point]) / (\$vertices_y[\$j] - \$vertices_y[\$point]) + \$vertices_x[\$point]) ) )
\$c = !\$c;
}
return \$c;
}
``````