Abstract Two algorithms for triangulating polyhedra, which give the number of
tetrahedra depending linearly on the number of vertices, are discussed.
Since the smallest possible number of tetrahedra necessary to triangulate
given polyhedra is of interest, for the first--``Greedy peeling" algorithm,
we give a better estimation of the greatest number of tetrahedra ($3n-20$
instead of $3n-11$), while for the second one--``cone triangulation", we
discuss cases when it is possible to improve it in such a way as to obtain a
smaller number of tetrahedra.
|