Metaballs are, in computer graphics, organic-looking n-dimensional objects. The technique for rendering metaballs was invented by Jim Blinn in the early 1980s.
Each metaball is defined as a function in n-dimensions (i.e. for three dimensions, f(x,y,z); three-dimensional metaballs tend to be most common, with two-dimensional implementations as well). A thresholding value is also chosen, to define a solid volume. Then,
:\sum_{i=0}^n \mbox{metaball}_i(x,y,z) \leq \mbox{threshold}
represents whether the volume enclosed by the surface defined by n metaballs is filled at (x,y,z) or not.
A ...