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, A Lower Bound of 1 + φ for Truthful Scheduling
Mechanisms

Elias Koutsoupias and Angelina Vidali

Department of Informatics, University of Athens
{elias,avidali}@di.uoa.gr



Abstract. We give an improved lower bound for the approximation ra-
tio of truthful mechanisms for the unrelated machines scheduling prob-
lem. The mechanism design version of the problem which was proposed
and studied in a seminal paper of Nisan and Ronen is at the core of the
emerging area of Algorithmic Game Theory. The new lower bound 1+φ ≈
2.618 is a step towards the final resolution of this important problem.


1 Introduction
We study the classical scheduling problem on unrelated machines [15,21,16] from
the mechanism-design point of view. There are n machines and m tasks each with
different execution times on each machine. The objective of the mechanism is to
schedule the tasks on the machines to minimize the makespan, i.e. to minimize
the time we have to wait until all tasks are executed. In the mechanism-design
version of the problem, the machines are selfish players that want to minimize the
execution time of the tasks assigned to them. To overcome their “laziness” the
mechanism pays them. With the payments, the objective of each player/machine
is to minimize the time of its own tasks minus the payment. A loose interpreta-
tion of the payments is that they are given to machines as an incentive to tell
the truth. A mechanism is called truthful when telling the truth is a dominant
strategy for each player: for all declarations of the other players, an optimal
strategy of the player is to tell the truth. A classical result in mechanism de-
sign, the Revelation Principle, states that for every mechanism, in which each
player has a dominant strategy, there is a truthful mechanism which achieves the
same objective. The Revelation Principle allows us to concentrate on truthful
mechanisms (at least for the class of centralized mechanisms).
A central question in the area of Algorithmic Mechanism Design is to deter-
mine the best approximation ratio of mechanisms. This question was raised by
Nisan and Ronen in their seminal work [23] and remains wide open today. The
current work improves the lower bound on the approximation to 1 + φ ≈ 2.618,
where φ is the golden ratio.
A lower bound on the approximation ratio can be of either computational or
information-theoretic nature. A lower bound is computational when it is based
on some assumption about the computational resources of the algorithm, most

Supported in part by IST-15964 (AEOLUS) and the Greek GSRT.

L. Kučera and A. Kučera (Eds.): MFCS 2007, LNCS 4708, pp. 454–464, 2007.

c Springer-Verlag Berlin Heidelberg 2007