Finding a collective set of items: From proportional multirepresentation to group recommendation
作者:
摘要
We consider the following problem: There is a set of items (e.g., movies) and a group of agents (e.g., passengers on a plane); each agent has some intrinsic utility for each of the items. Our goal is to pick a set of K items that maximize the total derived utility of all the agents (i.e., in our example we are to pick K movies that we put on the plane's entertainment system). However, the actual utility that an agent derives from a given item is only a fraction of its intrinsic one, and this fraction depends on how the agent ranks the item among the chosen, available, ones. We provide a formal specification of the model and provide concrete examples and settings where it is applicable. We show that the problem is hard in general, but we show a number of tractability results for its natural special cases.
论文关键词:Proportional representation,Ordered weighted average,Chamberlin–Courant rule,Computational complexity,Approximation,Elections,Voting
论文评审过程:Received 29 October 2015, Revised 3 June 2016, Accepted 16 September 2016, Available online 22 September 2016, Version of Record 4 October 2016.
论文官网地址:https://doi.org/10.1016/j.artint.2016.09.003