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I am writing simple a software renderer, and it works quite good, (working with triangle and sphere/circle primitives) but I've got some problems with depth buffer implementation - I need a version of Bresenham's circle algorithm that would be working with correct 3d values (needed to fill depth buffer). Simple 'flat' 2d circle version.

    void FillCircleWithDepth(int x1, int y1, float z, int radius, unsigned color)

     int left   = x1-radius-1;
     int right  = x1+radius+1;
     int up     = y1-radius-1;
     int down   = y1+radius+1;

     if(!_rectanglesOverlap(0, 0, CLIENT_X, CLIENT_Y,
                    left, up, right, down ) )

     int x  = 0;                   //0
     int y  = radius;              //1
     int d1 = 3 - (2 * radius);

     if (d1 < 0)      d1 += (x<<2) + 6;
     else             d1 += ((x-(y--))<<2) + 10;

     drawScanlineWithDepth(y1+x, x1-y, x1+y, z, color);
     drawScanlineWithDepth(y1-x, x1-y, x1+y, z, color);
     drawScanlineWithDepth(y1+y, x1-x, x1+x, z, color);
     drawScanlineWithDepth(y1-y, x1-x, x1+x, z, color);

brings depth buffer errors, I need also calculate proper z when drawing scan lines. How would the 3d version of it look?


I found here, on stack, a couple of close questions, but not one precise answer to that - there is some need for pressenham for spheres.. could someone answer to that?

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closed as not constructive by Bo Persson, Jonathan Leffler, Mac, Dante is not a Geek, Graviton Dec 6 '12 at 2:37

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Are you trying to draw a sphere, or are you trying to give a perspective look (further away objects are smaller) to a 2D circle? If you're trying to get a perspective look, simply scaling the radius proportionately to z might work well enough, though it won't give your normal perspective distortion. –  Cornstalks Dec 2 '12 at 22:42
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1 Answer

Just as is the case of triangles under 3d-projections, the reciprocal of 1/z behaves linearly; for every movement x+=dx or y+=dy there's involved a linear difference relation to the reciprocal of z: rec_z(x+dx,y+dy) = rec_z(x,y) + a*dx + b*dy, where a and b IIRC are almost trivially related to the normal vector of the plane.

This leads to another point: the normal vector has three components. While it's not that apparent from drawing triangles, drawing circles under perspective correction does not simply scale x and y, but there are more degrees of freedom.

(example of such image here) -- for copyright reasons it's a link rather than embedded.

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do not bother about perspective - just need sphere rasterization alghorithm (close to that above I wrote) which wil give also z coordinate for eaxh (x,y) plotted - it would be some kind of 'double bressenham' –  grunge fightr Dec 3 '12 at 10:48
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