Approximate Pareto Set for Fair and Efficient Allocation: Few Agent Types or Few Resource Types

Proceedings of the Twenty-Ninth International Joint Conference on Artificial Intelligence ◽

10.24963/ijcai.2020/41 ◽

2020 ◽

Author(s):

Trung Thanh Nguyen ◽

Jörg Rothe

Keyword(s):

Optimization Problem ◽

Fair Division ◽

Pareto Set ◽

Programming Algorithm ◽

Input Size ◽

Linear Programming Algorithm ◽

Fairness And Efficiency ◽

Bounded Size ◽

Item Types ◽

Dynamic Programming Scheme

In fair division of indivisible goods, finding an allocation that satisfies fairness and efficiency simultaneously is highly desired but computationally hard. We solve this problem approximately in polynomial time by modeling it as a bi-criteria optimization problem that can be solved efficiently by determining an approximate Pareto set of bounded size. We focus on two criteria: max-min fairness and utilitarian efficiency, and study this problem for the setting when there are only a few item types or a few agent types. We show in both cases that one can construct an approximate Pareto set in time polynomial in the input size, either by designing a dynamic programming scheme, or a linear-programming algorithm. Our techniques strengthen known methods and can be potentially applied to other notions of fairness and efficiency as well.

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A new algorithm for finding CRM-model coefficients

Tyumen State University Herald Physical and Mathematical Modeling Oil Gas Energy ◽

10.21684/2411-7978-2019-5-3-164-185 ◽

2019 ◽

Vol 5 (3) ◽

pp. 164-185 ◽

Cited By ~ 1

Author(s):

Alexander D. Bekman ◽

Sergey V. Stepanov ◽

Alexander A. Ruchkin ◽

Dmitry V. Zelenin

Keyword(s):

Approximate Solution ◽

Optimization Problem ◽

Optimal Solution ◽

Complex Form ◽

Approximate Solutions ◽

The Other ◽

Programming Algorithm ◽

Stochastic Algorithms ◽

Large Set ◽

Flow Rates

The quantitative evaluation of producer and injector well interference based on well operation data (profiles of flow rates/injectivities and bottomhole/reservoir pressures) with the help of CRM (Capacitance-Resistive Models) is an optimization problem with large set of variables and constraints. The analytical solution cannot be found because of the complex form of the objective function for this problem. Attempts to find the solution with stochastic algorithms take unacceptable time and the result may be far from the optimal solution. Besides, the use of universal (commercial) optimizers hides the details of step by step solution from the user, for example — the ambiguity of the solution as the result of data inaccuracy.<br> The present article concerns two variants of CRM problem. The authors present a new algorithm of solving the problems with the help of “General Quadratic Programming Algorithm”. The main advantage of the new algorithm is the greater performance in comparison with the other known algorithms. Its other advantage is the possibility of an ambiguity analysis. This article studies the conditions which guarantee that the first variant of problem has a unique solution, which can be found with the presented algorithm. Another algorithm for finding the approximate solution for the second variant of the problem is also considered. The method of visualization of approximate solutions set is presented. The results of experiments comparing the new algorithm with some previously known are given.

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