Perfect Partitions of Convex Sets in the Plane

   Abstract. For a region X in the plane, we denote by area(X) the area of X and by ℓ (∂ (X)) the length of the boundary of X . Let S be a convex set in the plane, let n ≥ 2 be an integer, and let α ₁ , α ₂ , . . . ,α _n be positive real numbers such that α ₁ +α ₂ + ⋅ ⋅ ⋅ +α _n =1 and 0< α _i ≤ 1/2 for all 1 ≤ i ≤ n . Then we shall show that S can be partitioned into n disjoint convex subsets T ₁ , T ₂ , . . . ,T _n so that each T _i satisfies the following three conditions: (i) area(T _i )=α _i × area(S) ; (ii) ℓ (T _i ∩ ∂ (S))= α _i × ℓ (∂ (S)) ; and (iii) T _i ∩ ∂ (S) consists of exactly one continuous curve.