Questions tagged [curve]
The curve tag has no usage guidance.
32
questions
2
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1
answer
331
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How should I generate Kochanek-Bartels spline endpoints?
I'm working on a program which uses Kochanek-Bartels ("TCB") splines.
My question is: How do I deal with the first/last points of the spline?
This type of spline needs a 'previous' and 'next' point ...
4
votes
1
answer
146
views
How to remove a control point from a NURBS curve?
I am trying to write an algorithm to remove a control point from a NURBS curve, similarly to what can be achieved using the CVREMOVE command in AutoCAD.
I searched online but I was unable to find a ...
2
votes
1
answer
977
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Rendering splines on GPU
We have an application which needs to render spline curves (cubic, bezier, b-spline etc.). We currently have working algorithms in C to stroke the control points of these curves into line strips.
The ...
3
votes
2
answers
629
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Fake cubic Hermite spline interpolation with smoothstep
When scaling an image with Bicubic Interpolation, the Cubic Hermite spline interpolation is used. smoothstep is one of the four basis/blend functions of this kind ...
0
votes
1
answer
296
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How to get coordinates of mouse after left mouse button is released after drag in OpenGL?
I want to get the coordinates of my mouse after the left mouse button is released after being dragged in OpenGL? I am new to this and wanted to know how I can implement it.
2
votes
2
answers
1k
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Continuity of parametric and geometric continuity
We know that in parametric continuity, $C^1$ continuity is two successive curve section $C_1$ and $C_2$ has first parametric derivative is same. That means tangent vector $t_1$ is same for both $C_1$ ...
1
vote
1
answer
1k
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Spline interpolation library in cpp
Have been searching a lot for a good spline interpolation library in cpp, came across one, which is the famous Eigen library , having the unsupported counterpart for spline fitting.<Here>.
I ...
1
vote
1
answer
179
views
How does the Lane Riesenfeld algorithm work?
I understand de Casteljau's algorithm and I am familiar although not fully experienced with B-Splines. I am trying to understand the geometric interpretation of B-splines through the algorithm (just ...
1
vote
1
answer
3k
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How to take the derivative of a Bézier curve?
I want to know how to take the derivative of a Bézier curve. I visited this website https://pages.mtu.edu/~shene/COURSES/cs3621/NOTES/spline/Bezier/bezier-der.html, but I am unable to figure out how ...
0
votes
1
answer
164
views
How do you compute the winding number of a closed poly curve?
Pretty much the title, given a closed curve in 2D, defined by a set of points, and a point. What's the algorithm to calculate the winding number of that curve, point pair?
4
votes
1
answer
652
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Conversion from cubic catmull-rom spline to cubic b-spline
I have a bunch of points that are the control vertices of a cubic catmull-rom spline. I would like to convert these to the control vertices of a cubic bspline.
I believe I can do this using this ...
3
votes
1
answer
580
views
Determining Rational Quadratic Bezier Curve Weights for Circle
I am trying to create a spherical interpolation with 3 points. I'm currently using Quadratic Bezier Interpolation but have been told I should use Rational Quadratic Bezier Curve in order to get a ...
3
votes
1
answer
222
views
How do people come up with subdivision schemes?
Be it chaikin subdivision, loop subdivision, catmull-clark subdivision...
How do people come up with the coefficients for an arbitrary subdivision scheme?
0
votes
0
answers
167
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Projecting one Quadratic Bezier Curve Onto Another
I'm working on improving an open source rasterization library called Gudni that I started a few years ago. It's source repository and the branch I'm currently working on are here:
https://github.com/...
3
votes
1
answer
357
views
Non least squares formulation to fit catmull rom spline
I have a set of unordered points that I'm getting from an image attached. I'd like to simply fit a parametrized curve such as a catmull-rom curve to with n control points (n = 4 to 10, and can be ...
2
votes
2
answers
126
views
Why cubic curves provide the minimum curvature interpolants?
As described by Shirley in his computer graphics book,
Cubic curves provide the minimum-curvature interpolants to a set of points. That is, if you have a set of n + 3 points and define the “...
2
votes
1
answer
281
views
If you can use subdivision surfaces for 2D curves
I've seen how subdivision surfaces are good for 3D curves/modeling, but haven't seen anything on if it's good, or even usable, in 2D.
My question is just that, if (a) you can even use subdivision ...
1
vote
1
answer
2k
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B spline curve generation in Python
I am using the de boors algorithm to generate B splines in python. However I am getting spikes in the final figure. I do not understand why this happens. I am posting my code here for reference
<...
0
votes
1
answer
239
views
Midpoint Algorithm Fast Direction
I've been exploring the Midpoint algorithm for drawing lines and curves, and I have a quick question: How should you determine the fast direction for a curve? I've seen that if the shape is simple, ...
1
vote
0
answers
40
views
Program to visualize geodesics and linear projection of an ellipsoid simultaneously
I am trying to solve a problem in computer graphics but to do it I need to be able to see a comparison of geodesic lines and straigth line projections on the ellipsoid.
I have not been able to ...
4
votes
1
answer
331
views
Polygons versus curve primitives in software rendering
Most 3D video games since the nineties have used hardware rendering based on polygons. Why polygons? They work well for some things, but not so well for others, e.g. a human figure rendered in ...
3
votes
3
answers
112
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Does the blending matrix change between calculating various curve segments in a uniform cubic B-splines approximation?
I would like to ask about uniform (periodic) cubic B-splines (approximation, no interpolation).
$$B=1/6\begin{bmatrix}-1&3&-3&1\\3&-6&3&0\\-3&0&3&0\\1&4&1&...
3
votes
1
answer
513
views
How to use Monotone cubic interpolation in 3D?
I wanted to use Monotone cubic interpolation, but the site only provide explanation for 2D case. How can I extend it to 3D?
4
votes
2
answers
180
views
Move position in smooth gradient
I am decrementing/incrementing position x until it reaches y. However, this creates a rectangular-like path. I want position x to smoothly curve towards y (diagonally) on a 2D plane.
What kind of ...
3
votes
1
answer
3k
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How to deform some mesh so that it fits along a spline curve? [closed]
Given a set of vertices, transforming them to fit onto some spline curve.
For example 3D modelling software has extrude along curve and Unreal Engine has a spline mesh component that takes some mesh ...
1
vote
0
answers
318
views
Curves fairness
Curves fairness is a strange problem in Computer Aided Geometric Design and every author gives his personal definition.
One of the simplest is the following:
A curve is said to be fair if
(1) it is ...
6
votes
1
answer
282
views
Converting raster shape/blob into displacement map
I am a beginner in digital image processing and computer graphics. I would like to program a similar behavior than the Shadermap 3 normal editor (displacement layer more specifically).
As shown in ...
11
votes
3
answers
3k
views
Ordering a set of unorganized points along a curve
I have a set of 3D points (which I recover from a library that performs the tessellation of a solid body) that belong to a curve (i.e., an edge of the solid). That means that the curve surely passes ...
7
votes
1
answer
1k
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How to calculate matching roundness of two offset rectangles?
I have two rectangles — one with a fill (blue) and one with a stroke (red). The red rectangle is being offset (depending on the stroke width) so that it appears snug and outside the edge of the blue ...
8
votes
2
answers
2k
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Is there some kind of Bresenham algorithm or equivalent for scanline rendering a rotated ellipse?
Back in the day when you often had to write your own low level rendering algorithms we all used to learn the Bresenham algorithms for lines and circles.
It was almost trivially easy to extend the ...
7
votes
1
answer
494
views
Algorithms for scan converting b-spline and nurbs
In all computer graphics books there are algorithms for scan converting simple primitives like lines, circles, ellipse,...
I can't find algorithms for more advanced curves like bezier curves, b-...
10
votes
1
answer
662
views
How do I accurately compute coverage of overlapping analytical curves?
Antialiasing of 2D shapes boils down to computing the fraction of a pixel that is covered by the shape. For simple non-overlapping shapes, this is not too difficult: clip the shape against the pixel ...