Fair Division with Indivisible Goods, Chores, and Cake

Abstract

We study the problem of fairly allocating indivisible items and a desirable heterogeneous divisible good (i.e., cake) to agents with additive utilities. In our paper, each indivisible item can be a good that yields non-negative utilities to some agents and a chore that yields negative utilities to the other agents. Given a fixed set of divisible and indivisible resources, we investigate almost envy-free allocations, captured by the natural fairness concept of envy-freeness for mixed resources (EFM). It requires that an agent i does not envy another agent j if agent j's bundle contains any piece of cake yielding positive utility to agent i (i.e., envy-freeness), and agent i is envy-free up to one item (EF1) towards agent j otherwise. We prove that with indivisible items and a cake, an EFM allocation always exists for any number of agents with additive utilities.

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