4 research outputs found
Holes or Empty Pseudo-Triangles in Planar Point Sets
Let denote the smallest integer such that any set of at least
points in the plane, no three on a line, contains either an empty
convex polygon with vertices or an empty pseudo-triangle with
vertices. The existence of for positive integers ,
is the consequence of a result proved by Valtr [Discrete and Computational
Geometry, Vol. 37, 565--576, 2007]. In this paper, following a series of new
results about the existence of empty pseudo-triangles in point sets with
triangular convex hulls, we determine the exact values of and , and prove bounds on and , for . By
dropping the emptiness condition, we define another related quantity , which is the smallest integer such that any set of at least points in the plane, no three on a line, contains a convex polygon with
vertices or a pseudo-triangle with vertices. Extending a result of
Bisztriczky and T\'oth [Discrete Geometry, Marcel Dekker, 49--58, 2003], we
obtain the exact values of and , and obtain non-trivial
bounds on .Comment: A minor error in the proof of Theorem 2 fixed. Typos corrected. 19
pages, 11 figure