Resumen
We introduce multidimensional congestion games, that is, congestion games whose set of players is partitioned into ??+1
d
+
1
clusters ??0,??1,?,????
C
0
,
C
1
,
?
,
C
d
. Players in ??0
C
0
have full information about all the other participants in the game, while players in ????
C
i
, for any 1=??=??
1
=
i
=
d
, have full information only about the members of ??0?????
C
0
?
C
i
and are unaware of all the others. This model has at least two interesting applications: (??)
(
i
)
it is a special case of graphical congestion games induced by an undirected social knowledge graph with independence number equal to d, and (????)
(
i
i
)
it represents scenarios in which players have a type and the level of competition they experience on a resource depends on their type and on the types of the other players using it. We focus on the case in which the cost function associated with each resource is affine and bound the price of anarchy and stability as a function of d with respect to two meaningful social cost functions and for both weighted and unweighted players. We also provide refined bounds for the special case of ??=2
d
=
2
in presence of unweighted players.