Complejidad computacional de problemas de distribución justa de recursos desde el punto de vista descriptivo.

Abstract

In the context of descriptive computational complexity, first-order projections are many-one reductions that possess very little computational power. In this undergraduate project, three fair division problems found in Bouveret and Lang’s “Efficiency and Envy-freeness in Fair Division of Indivisible Goods: Logical Representation and Complexity” are proved NP-hard via first-order projections. To get one of the results, a generalization of the concept of superfluity found in Borges and Bonet’s “Universal First-Order Logic is Superfluous for NL, P, NP and coNP” is used.