# Position of a point relative to a Bezier curve

I have a Bezier curve specified by 4 points. I need to know if a point is on the left side or right side of the Bezier curve. Can you suggest me an algorithm?

Edit: I'm sure that the way I generate the Bezier curve would not form loops.

Later edit I realized that my initial problem could be solved without using relative position. When I posted this question I was thinking that there is a mathematical formula for relative position similarly with checking if a point is in the interior of a circle. It seems that this is not possible. So I will accept the answer which will suggest a time efficient solution.

• You may need to be a little more specific about what you are trying to achieve... what kind of answer do you expect for example if the bezier curve forms a loop? – jerryjvl May 28 '09 at 12:59
• I want to move an object following a Bezier curve trajectory. If his current position is on the left side of the curve I change his direction to the right and vice versa. – Ionel Bratianu May 28 '09 at 13:15
• Note that Bezier curves can definitely form loops... if you cross over the control vertices relative to the end points, e.g. have the four vertices be in order: (0, 0), (100, 100), (100, 0), (0, 100) should do the trick. – jerryjvl May 29 '09 at 1:07
• I know that the Bezier curves can form loops but in my program the control points are chosen in such way that loops don't occur. – Ionel Bratianu May 29 '09 at 7:47

## 5 Answers

You can determine the closest point on the bezier curve with a pretty straightforward algorithm (related to k-subdivision. DeCastleju's Algorithm.) Look at the graphics gems if you need specifics.

At that point, even with loops, you can determine side-ness by determining if the vector to your tested point from the closest point is on the left of right hand of the vector that goes along the curve (velocity? - not sure of the correct term here...) of the bezier at the closest point you determined.

You can get -that- by cross product of the two vectors. Negative or positive will determine the handedness and which side of the line you are on.

Of course, in a loop the sideness will be defined as if you were a car driving down the line, would you be looking out the right or left window at the point as you go by... Not if you are to the right or left of the whole bezier squiggle. So it depends on how you define "sideness"

Sorry if my terms are off. Its been awhile since I had to do anything with Bezier's

It would be easier to draw a picture ;)

• I found the solution in Graphic Gems: Solving the Nearest-Point-on-Curve Problem by Schneider, Philip J. Thank you for telling me about Graphic Gems ;;) – Ionel Bratianu May 29 '09 at 8:34

If you just want your object to follow the curve (as you say in your comment), why don't you just move your object with the parametric equation ? See this article

Here is math for cubic and quadratic Bezier curve implicitization.

I cannot remember the math at this late hour, but you'd probably want to use a subdivision algorithm for the curve to progressively refine it until the segments are 'straight' enough that you can treat them as line segments for the purposes of your determination.

You may be able to get a quicker answer by using the bounding polyhedra of the curve refinements to determine at which point your 'point' is outside all of the polyhedra, and then immediately flatten to line segments.

Assuming the point constrained to the curve, you must define one of the anchors as the start and the other as the end, then calculate a point that belongs to the curve and is in the middle (length's half)... that way you can say if the point is between the start and the middle or the middle and the end.

Is that what you want or am I totally lost?

• Starting from this picture moshplant.com/direct-or/bezier/curve01.gifI want to know if a point is on the left side or right side of the curve. Of course there are several cases and some of them where there is no right or left side. But for the sake of the example I consider only the case of the curve from image. The answer of <b>jerryjvl</b> seems to be good enough but I want to know the performance of that algorithm. Or if there is a better algorithm. Sorry for being so incoherent :( English is not my first tongue – Ionel Bratianu May 29 '09 at 8:10
• mine neither! soy venezolano! – coma May 29 '09 at 15:43