On the m-point convexity

Abstract

Let S⊂ Rd (d≥ 2). A set S is said to be m-point convex, if for every m distinct points in S, at least one of the line-segments determined by them lies in S. We also say that S has property Pm. Let x,y,z∈ Rd. If conv\x,y,z\ is a right triangle, then \x,y,z\ is called a right triple. A set S is said to have the right-3-point property,if, for every right triple of S, at least one of the line-segments determined by them belongs to S. In particular, it has the double right-3-point property, if, for every right triple in S, at least two of the line-segments determined by them belong to S. In this paper, we further investigate m-point convex sets and establish the relationship between the sets with the double right-3-point property and convex sets in Rd.