On Isosceles Triangles and Related Problems in a Convex Polygon

Abstract

Given any convex n-gon, in this article, we: (i) prove that its vertices can form at most n2/2 + (n n) isosceles trianges with two sides of unit length and show that this bound is optimal in the first order, (ii) conjecture that its vertices can form at most 3n2/4 + o(n2) isosceles triangles and prove this conjecture for a special group of convex n-gons, (iii) prove that its vertices can form at most n/k regular k-gons for any integer k 4 and that this bound is optimal, and (iv) provide a short proof that the sum of all the distances between its vertices is at least (n-1)/2 and at most n/2 n/2 (1/2) as long as the convex n-gon has unit perimeter.