In this chapter, we introduce the first of two geometric objects that we associate with cake division. We also introduce various notions and questions that will be important in later chapters. We call this geometric object the Individual Pieces Set, or IPS. Our present focus is the two-player context. In Chapter 4, we consider the general case of n players, where we shall also introduce a generalized version of the IPS, called the Full Individual Pieces Set. Throughout this chapter, the measures m1 and m2 may or may not be absolutely continuous with respect to each other.

Definition 2.1 For any partition P = 〈P1, P2〉 of C, let m(P) = (m1(P1), m2(P2)). The Individual Pieces Set, or IPS, is the set {m (P) : P ∈ Part}.

Notice that IPS ⊆ R2.

Of course, the IPS depends upon C, m1, and m2, and thus we shall always need to be sure that when we write “the IPS” the corresponding cake and measures are clear by context.

We wish to understand the general shape and geometric properties of the IPS. What do we know about points in the IPS? We can imagine all of the cake being given to Player 1. The associated partition is 〈C, ø〉 and the corresponding point in the IPS is (1, 0).