Fair partitioning by straight lines

Abstract

A pizza is a pair of planar convex bodies A⊂eq B,where B represents the dough and A the topping of the pizza. A partition of a pizza by straight lines is a succession of double operations:a cut by a full straight line, followed by a Euclidean move of one of theresulting pieces; then the procedure is repeated.The final partition is said to be fair if each resulting slice has the same amount of A and the same amount of B.This note proves that, given an integer n≥2, there exists a fair partition by straight lines of any pizza (A,B) into n parts if and onlyif n is even.The proof uses the following result:For any planar convex bodies A, B with A⊂eq B, and anyα∈\,]0,12[\,, there exists an α-section of A which is aβ-section of B for some β≥α. (An α-section of A is a straight line cutting A into two parts, one of which has area α|A|.)The question remains open if the word "planar" is dropped.