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For example, I want to plot the function

f(x,y) =sin(x^2+y^2)/(x^2+y^2),       x^2+y^2 <=4π

In Mathematica, I can do it as following:

Plot3D[Sin[x^2 + y^2]/(x^2 + y^2), {x, -4, 4}, {y, -4, 4}, 
 RegionFunction -> (#1^2 + #2^2 <= 4 Pi &)]

Where the RegionFunction specified the region of x,y to plot. enter image description here

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have you tried searching for 3d polar plot: f(r) = sin(r^2)/r^2 –  Rasman Nov 14 '12 at 4:29
1  
@Rasman But if the region is not circle area? Like |x|+|y|<=1 –  Eastsun Nov 14 '12 at 4:36

2 Answers 2

up vote 5 down vote accepted

Here's a not particularly elegant solution that sets the function values of the region you don't want to see to -infinity.

[x, y] = meshgrid(-4:0.1:4, -4:0.1:4);
z = sin(x.^2+y.^2)./(x.^2+y.^2);
idx = x.^2 + y.^2 > 4*pi;
z(idx) = -Inf;
surf(x, y, z); axis vis3d;

Edit. Actually, if you try a finer grid (say -4:0.01:4) and add shading interp it doesn't look too bad.

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MATLAB makes use of Inf in its built-in functions extensively, so I don't think there's any issue with elegance here. –  rwong Nov 14 '12 at 6:07
    
Agree with rwong. The only flaw is that the region's edge of the plot generated by Matlab is not as smooth as Mathematica's, –  Eastsun Nov 14 '12 at 6:25
1  
@Eastsun Re: the smoothness, it is because Mathematica uses adaptive sampling with more points where the function is sharply changing and fewer where it is relatively flat. On the other hand, using meshgrid in MATLAB samples the space evenly and can lead to jaggedness and you can end up missing "interesting" features. You can replicate this in Mathematica by setting MaxRecursions -> 0. Compare the regular sampling with MaxRecursions -> 0 here and the default adaptive sampling here (MaxRecursions -> 2). –  r.m. Nov 14 '12 at 20:10

A slight variation to 3lectrologos's solution, with emphasis on keeping what you want:

x = -4*pi:0.01:4*pi;
y = -4*pi:0.01:4*pi;
[X,Y] = meshgrid(x,y);
Clean = (X.^2 + Y.^2)<=4*pi;
Y = Y.*Clean;
X = X.*Clean;

X(~any(X,2),:) = [];
X(:, ~any(X,1)) = [];
Y(~any(Y,2),:) = [];
Y(:, ~any(Y,1)) = [];

F = sin(X.^2+Y.^2)./(X.^2+Y.^2);
mesh(X,Y,F)

Note that in this case, you need to make sure that (0,0) is in your solution profile.

Edit: compressing matrices for easier plotting

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Thanks for your help. However, I prefer 3lectrologos's solution. –  Eastsun Nov 14 '12 at 6:18

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