Convex Sequence and Convex Polygon
Abstract
In this paper, we deal with the question; under what conditions the points Pi(xi,yi) (i = 1,·s, n) form a convex polygon provided x1 < ·s < xn holds. One of the main findings of the paper can be stated as follows: "Let P1(x1,y1),·s ,Pn(xn,yn) are n distinct points (n≥3) with x1<·s<xn. Then P1P2,·s PnP1 form a convex n-gon that lies in the half-space equation* H=\(x,y)| x∈R and y≤ y1+(x-x1xn-x1)(yn-y1)\⊂eqR2 equation* if and only if the following inequality holds equation yi-yi-1xi-xi-1 ≤ yi+1-yixi+1-xi for all i∈\2,·s,n-1\ ." equation Based on this result, we establish a linkage between the property of sequential convexity and convex polygon. We show that in a plane if any n points are scattered in such a way that their horizontal and vertical distances preserve some specific monotonic properties; then those points form a 2-dimensional convex polytope.
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