# Point Crossing Line-Path Algorithim

I have a problem in which i need to verify if a point had crossed a line-path,
a line path is collection of line(y=ax+b).
Does anyone know some known algorithim for this?

so i solved it like this: i added 2 points in the start and the end of the path- so now it is a polygon i added the 2 points in 90 degrees to the points in a fixed distance. and i used the ray algorithim.

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Make your own algorithm! A point can have 2 states, either on one side of the line, or the other (or on it...I guess). Just check if a point ever changes state. –  Jiminion Jul 24 '13 at 13:50
By "collection of line" do you mean a collection of line segments? Are the segments connected? If you don't mean segments, what does it mean for a point to "cross" three lines? Is the point moving? –  Joni Jul 24 '13 at 13:52
joni: i mean connected segments, a point can cross one line of the segment but in fact it hasnt crossed the segmant. –  user1763180 Jul 24 '13 at 13:55
Get some inspiration here: stackoverflow.com/questions/385305/… –  fvu Jul 24 '13 at 13:56
@user1763180: You mean like a ray crossing a polygon from side to the other?Just that the polygon is represented by a set of segments? –  Aravind Jul 24 '13 at 14:25

There are simple algorithms to know if a point is inside or outside a polygon: http://en.wikipedia.org/wiki/Point_in_polygon This can be adapted to a line path setting by pushing some edges of the polygon to infinity (in practice, you can put your line path in a large box and cansider the polygon formed by the part of the box that is on the right (or left, as you want) side of the line).

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Given a input point (x_1, y_1) , and your line is of the form `y = ax + b`, then you can tell where your input point locates by putting x_1 into the line equation:

``````if y_1 == a * x_1 + b then (x_1, y_1) is on the line
if y_1 < a * x_1 + b then (x_1, y_1) locates below the line
if y_1 > a * x_1 + b then (x_1, y_1) locates above the line
``````

So you can tell whether a point has crossed a line by keeping track of the above result of that point.

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so i solved it like this: i added 2 points in the start and the end of the path- so now it is a polygon i added the 2 points in 90 degrees to the points in a fixed distance. and i used the ray algorithim.

edit: its not always 90 degrees, it's depens on the angle between point start and point end

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I know of two approaches:

1. use adapted point inside polygon algorithm
• you must know which way is which side (crossed/non-crossed side)
• so create a vector dir which points from line patch to the crossing side
• it can be average normal (or normal of start-end point line)
• cast ray from tested point in dir direction
• count intersections with your line patch
• if intersection occurs exactly on a connection point of two lines count it only once
• at the end if the count is nonzero and odd then point has crossed line patch
• this is robust error prone but little bit slow
• see the left picture
2. if your line patch is not too complex shaped use winding rule (scalar vector multiplication)
• line patch lines must be in single direction from start to end !!!
• select lines from patch that are close to your point (1-5 should be sufficient)
• ideally at the same height on the right picture
• of course in real it can be rotated so select lines by the distance (no need to sqrt it)
• compute dot product for selected lines like this:
• line P0,P1, point P -> dot product = ((P1-P0).(P-P1))
• dot product of 2 vectors ((x0,y0,z0).(x1,y1,z1))=(x0*x1+y0*y1+z0*z1)
• the polarity of the result means the winding direction CW/CCW
• if all the windings are correct than the point is not crossed
• if the line patch shape is complex then problems can occur if point is too close to it
• in that case test only lines of the same 'height' or use method 1.
• to get the 'height' compute the distance between point and the line start point in lines direction
• if its from zero to size of line that its OK else do not use it
• also can be done with dot product on normal vector to line direction

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sorry for the small text in picture i am too lazy to redraw it if you have a problem reading it save the picture on disk (image is just scaled to be small on this site) or zoom in your brownser –  Spektre Oct 5 '13 at 8:39