curvature of a discrete function

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David Kusnirak
David Kusnirak 2013년 1월 16일
편집: Jan 2022년 3월 13일
Hello,
I need to compute a curvature of a simple 2D discrete function like this one:
x=1:0.5:20;
y=exp(x);
can anybody help how to do that? thanks
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Matt J
Matt J 2013년 1월 16일
Your function looks 1D to me.

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채택된 답변

Jan
Jan 2013년 1월 16일
편집: Jan 2022년 3월 13일
Your function seems to be a 1D function.
Are you looking for the 2nd derivative? While diff calculates the one-sided differential quotient, gradient uses the two-sided inside the interval:
gradient(gradient(y))
If you mean the curvature as reciprocal radius of the local fitting circle:
dx = gradient(x);
ddx = gradient(dx);
dy = gradient(y);
ddy = gradient(dy);
num = dx .* ddy - ddx .* dy;
denom = dx .* dx + dy .* dy;
denom = sqrt(denom) .^ 3;
curvature = num ./ denom;
curvature(denom < 0) = NaN;
Please test this, because I'm not sure if I remember the formulas correctly.
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Jan
Jan 2013년 1월 16일
편집: Jan 2013년 1월 16일
Therefore I'm using an efficient C-Mex function: FEX: DGradient, which is 10 to 20 times faster and handles unevenly spaced data more accurate.
Jan
Jan 2013년 1월 16일
편집: Jan 2022년 3월 13일
x = rand(1, 1e6);
tic; ddx = gradient(gradient(x)); toc
tic; ddx = DGradient(DGradient(x)); toc
tic; ddx = conv(x,[.25 0 -.5 0 .25],'same'); toc
Elapsed time is 0.251547 seconds.
Elapsed time is 0.025728 seconds.
Elapsed time is 0.028208 seconds
Matlab 2009a/64, Core2Duo, Win7

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추가 답변 (2개)

Roger Stafford
Roger Stafford 2013년 1월 16일
편집: Bruno Luong 2022년 3월 13일
Let (x1,y1), (x2,y2), and (x3,y3) be three successive points on your curve. The curvature of a circle drawn through them is simply four times the area of the triangle formed by the three points divided by the product of its three sides. Using the coordinates of the points this is given by:
K = 2*abs((x2-x1).*(y3-y1)-(x3-x1).*(y2-y1)) ./ ...
sqrt(((x2-x1).^2+(y2-y1).^2).*((x3-x1).^2+(y3-y1).^2).*((x3-x2).^2+(y3-y2).^2));
You can consider this as an approximation to the curve's curvature at the middle point of the three points.
Matt J
Matt J 2013년 1월 16일
편집: Matt J 2013년 1월 16일
diff(y,2)./0.5^2

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