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Suppose you have f(x)=x-floor(x).

enter image description here

By this, you can generate the grooves by gluing the top side and the bottom side together and then squeezing the left to zero -- now you have a conical helix: the line spins around the cone until it hits the bottom. You already have one form of the equations for the conical helix namely x=a*cos(a); y=a*sin(a); z=a. Now like here:

How can you project the conical helix on the cone in Matlab?

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I suppose you are looking for 1./( t .* sin(t) ) and not sin(t)./t? The way you wrote that expression, Matlab would interpret it as a latter one. – plesiv Jan 27 '13 at 23:18
@zplesivcak perhaps, I don't know yet -- I am trying to understand how to twist the surface of the cone first i.e. to add the fluctuation term. I like to think it only as a projection along the surface but then I need to find out somehow the normal vector of the surface in each point, thinking. Perhaps I think this too mathematically?! – hhh Jan 27 '13 at 23:21
1./( t .* sin(t) ) is really awful looking function with lots of poles, so I think that you need sin(t)./t ... – plesiv Jan 27 '13 at 23:27
if indeed zplesivcak is right, then you can also use sinc – bla Jan 28 '13 at 0:59
up vote 4 down vote accepted

I'd approach your problem without using plot3, instead I'd use meshgrid and sinc. Note that sinc is a matlab built in functions that just do sin(x)./x, for example:

enter image description here

So in 1-D, if I understand you correctly you want to "project" sinc(x) on sqrt(x.^2). The problem with your question is that you mention projection with the dot product, but a dot product reduces the dimensionality, so a dot product of two vectors gives a scalar, and of two 2D surfaces - a vector, so I don't understand what you mean. From the 2-D plot you added I interpreted the question as to "dress" one function with the other, like in addition...

Here's the implementation:

[x y]=meshgrid(linspace(-3*pi,3*pi,N),linspace(-3*pi,3*pi,N));

mesh(x,y,f) ;      axis vis3d

view(0,0) ;  axis square
colormap bone

enter image description here

The factor 2 in the sinc was placed for better visualization of the fluctuations of the sinc.

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I cannot understand "t=sqrt(x.^2+y.^2);" -- does it have now greater fluctuation on the peak and smaller near the broad area? This "t=f=t+2*sinc(t).*t" makes it look oscillating the same along the surface -- perhaps now too large oscillation? I have to still study this to understand. I tried f=1./t+2*sinc(t) but getting far to large peak, testing... – hhh Jan 28 '13 at 6:42
t is just the radius, meaning z(x,y)=sqrt(x^2+y^2)=t will yield a cone. As for sinc, I'm not sure if that is the function you meant, but you can read about it in the documentation in the link, I've also added a plot of it in the answer. Why did you multiplied t*sinc in your comment? doing so you end up with the regular sin and not sinc... – bla Jan 28 '13 at 6:55
Missing the screw-shape (the hand-drawn picture), the pointy head and descending fluctuation from the broad area to top (top with the smallest amplitude) -- tried f=t+2*fliplr(sinc(t)) but not workingn -- still debugging, perhaps solving things myself but taking some time. – hhh Jan 28 '13 at 12:21
sinc is a symmetric function, fliplr won't change it. I think you need to first find the function that will do what you need, it see,s that sinc is not it. maybe you need something like f=t+exp(-t/a).*cos(b*t); – bla Jan 28 '13 at 17:07

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