Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I would like to plot how the amplitude and orientation of a 2D vector evolves over time. To do this I would like to create a graph reminiscent of the canonical E & B field graphs you may recall from an introductory electricity and magnetism class.

alt text

Specifically, I would like to connect my 2D vector points with a ribbon, so that they are easy to see. Is there a simple way to do this in MATLAB? quiver3 is pretty close, but it lacks the ribbon. Perhaps some sort of parametric surface?

share|improve this question

2 Answers 2

up vote 3 down vote accepted

here's a solution that draws a ribbon between any two lines in 3D space. you can plot your quiver over it & adjust the opacity using 'FaceAlpha' as in gnovice's solution

To make the function clearer, I am first posting it without error-checking and resizing functions (which make up most of the body of the function & aren't particularly interesting)

function h = filledRibbon (x,y,z,u,v,w,c, varargin)
%function filledRibbon (x,y,z,u,v,w,c, varargin)
%
%plots a ribbon spanning the area between the lines x,y,z and x+u,y+v,z+w
%in the color c
%varargin is passed directly to patch
%returns a handle to the patch graphic created

%make up a set of regions that span the space between the lines

xr = [x(1:end-1); x(1:end-1) + u(1:end-1); x(2:end) + u(2:end); x(2:end)];
yr = [y(1:end-1); y(1:end-1) + v(1:end-1); y(2:end) + v(2:end); y(2:end)];
zr = [z(1:end-1); z(1:end-1) + w(1:end-1); z(2:end) + w(2:end); z(2:end)];

%plot the regions with no edges
h = patch(xr,yr,zr,c, 'LineStyle','none', varargin{:});

use this error-checking version in your actual code:

function h = filledRibbon (x,y,z,u,v,w,c, varargin)
%function filledRibbon (x,y,z,u,v,w,c, varargin)
%
%plots a ribbon spanning the area between the lines x,y,z and x+u,y+v,z+w
%in the color c
%varargin is passed directly to patch
%returns a handle to the patch graphic created


if ~exist('w', 'var') || isempty(w)
    w = 0;
end
if ~exist('u', 'var') || isempty(u)
    u = 0;
end
if ~exist('v', 'var') || isempty(v)
    v = 0;
end
if ~exist('c', 'var') || isempty(c)
    c = 'b';
end


%make all vectors 1xN 
x = reshape(x,1,[]);
y = reshape(y,1,[]);
z = reshape(z,1,[]);

%if any offsets are scalar, expand to a vector
if all(size(u) == 1)
    u = repmat(u, size(x));
end

if all(size(v) == 1)
    v = repmat(v, size(x));
end
if all(size(w) == 1)
    w = repmat(w, size(x));
end

%make up a set of regions that span the space between the lines

xr = [x(1:end-1); x(1:end-1) + u(1:end-1); x(2:end) + u(2:end); x(2:end)];
yr = [y(1:end-1); y(1:end-1) + v(1:end-1); y(2:end) + v(2:end); y(2:end)];
zr = [z(1:end-1); z(1:end-1) + w(1:end-1); z(2:end) + w(2:end); z(2:end)];

%plot the regions with no edges
h = patch(xr,yr,zr,c, 'LineStyle','none', varargin{:});
share|improve this answer
    
Brilliant! I ran this: x=[0:.1:3*pi]; w=sin(x); v=cos(x); u=zeros(size(x)); y=zeros(size(x)); z=zeros(size(x)); c='r'; filledRibbon(x,y,z,u,v,w,c,'FaceAlpha',0.2); axis vis3d; It works like a charm. –  AndyL Oct 20 '10 at 21:01

You can use the plotting functions FILL3 and QUIVER3 to do something like this:

x = linspace(0,4*pi,30);  %# Create some x data
y1 = sin(x);              %# Create wave 1
y2 = sin(x-pi);           %# Create wave 2
u = zeros(size(x));       %# Create a vector of zeroes

hRibbon1 = fill3(x,y1,u,'r');     %# Plot wave 1 and fill underneath with color
set(hRibbon1,'EdgeColor','r',...  %# Change the edge color and
             'FaceAlpha',0.5);    %#   make the colored patch transparent
hold on;                          %# Add to the existing plot
quiver3(x,u,u,u,y1,u,0,'r');      %# Plot the arrows

hRibbon2 = fill3(x,u,y2,'b');     %# Plot wave 2 and fill underneath with color
set(hRibbon2,'EdgeColor','b',...  %# Change the edge color and
             'FaceAlpha',0.5);    %#   make the colored patch transparent
quiver3(x,u,u,u,u,y2,0,'b');      %# Plot the arrows
axis equal;                       %# Use equal axis scaling

And here's the resulting plot:

alt text

share|improve this answer
    
This is quite brilliant and exactly recapitulates the figure, but it has some limitations for what I am trying to do. I am interested in the case where the vector can rotate. E.g. y=sin(t), x=sin(t-pi/2) and where the vector is free to not necessarily start or end at zero. In other words a twisting ribbon. In this example the ribbon only works if the vector starts or ends at zero and the fill does not seem to deal with a twisting curve well. I apologize if this was less clear in the question. I had a hard time finding a twisty ribbon diagram online. –  AndyL Oct 20 '10 at 19:57

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.