DYNAMIC SERVICE DISCRIMINATION STRATEGY
DEVELOPMENT USING GAME THEORY
Kwang Sup Shin, Suk-Ho Kang
Department of Industrial Engineering, Seoul National University, Korea
Jae-Yoon Jung
Department of Industrial and Management Systems Engineering, Kyung Hee University, Korea
Doug Young Suh
Department of Electronic and Radio Engineering, Kyung Hee University, Korea
Keywords: Multimedia resource allocation, Service discrimination, Game theory, Bargaining solution.
Abstract: This research proposes a dynamic service discrimination strategy for wireless multimedia services. In
particular, bargaining solutions in the game theory are applied to allocate the limited resources to users for
the purpose of proportional fairness. We assume that users can choose one of discriminated media services
and multimedia resources are then allocated to users according to their service selections. In the mechanism,
an efficiency function for the network manager and a utility function for users are devised to reflect quality
of service and cost. The optimized service discrimination and resource allocation policy have been
developed not only from user’s standpoint, but also from network manager’s. We illustrated experimental
results with synthesis multimedia data and analyzed the effect of the proposed service differentiation and
resource allocation algorithms.
1 INTRODUCTION
As the real-time wireless multimedia service
requires pretty much resource, it has been the major
issues to utilize the limited resources in the wireless
network. There are lots of researches how to utilize
the limited resources, especially using the game
theoretic approaches. Game theory has been already
applied and shown the advances to improve the
performance of resource allocation in the various
research areas including wireless multimedia
networks.
The most intuitive way to allocate resources is to
equally allocate resources to the participating users.
But an important disadvantage of this policy is that it
does not consider characteristics of users and
systems. Alternatively, the notion of proportional
fairness was introduced to allocate resources based
on the user’s requirements (Kelly, Maulloo, & Tan,
1998). In the point of proportional fairness, KSBS
(Kalai-Smorodinsky Bargaining Solution) was
compared with the NBS. Park and Schaar (2007)
analyzed the optimality conditions of both solutions
and differences between the quantitative
proportional fairness of NBS and the qualitative one
of KSBS. Although this proportional fairness policy
was successfully implemented in several works
(Kelly, Maulloo & Tan, 1998), it is not suitable for
content aware multimedia applications since it does
not consider explicitly the resulting impact on the
quality of the service (Park & Schaar, 2007).
In this research, the concept of cost, to model the
efforts which users invest to achieve their own goals,
is additionally considered to express user’s
satisfaction. Although there are a lot of researches
related to the costing or pricing (Courcoubetis, Siris
& Stamoulis, 1996; Shenker, 1995), it is general to
charge according to the amount of allocated
resources (Avriel, 1976). And the most important
thing is that pricing mechanism and resource
allocation policy should be able to maximize the
282
Sup Shin K., Kang S., Jung J. and Young Suh D. (2010).
DYNAMIC SERVICE DISCRIMINATION STRATEGY DEVELOPMENT USING GAME THEORY.
In Proceedings of the 2nd International Conference on Agents and Artificial Intelligence - Agents, pages 282-286
DOI: 10.5220/0002714902820286
Copyright
c
SciTePress
profit or revenue of each participants of the game
(Ya¨ıche, Mazumdar,& Rosenberg, 2003).
2 BASIC ASSUMPTIONS
The salient concepts and the basic assumptions for
service discrimination and the resource allocation
game are presented. Parameters and descriptions are
summarized in Table 1.
Table 1: Parameters and descriptions.
Parameters Descriptions
M
AX
R
total available resource
M
AX
i
R
maximum requirement of user
i
0
i
R
minimum requirement user
i
i
R
amount of resource allocated to user
i
j
C
unit price for resource of jth service type
ij
x
decision variable of user
i
i
α
bargaining power of user
i
j
β
bargaining power of
j th service type
()
i
π
⋅
utility function of user
i
i
X
utility of user
i
j
E
F
resource usage efficiency of jth service type
ζ
weight value for the linear combination of
service discrimination strategies
In this research, following wireless communication
network is assumed.
There are
n
users who compete
for the available network resources. A user
i
has its
own utility function
()()
ii
R
π
which can be derived
from the allocated resource
(
)
i
R
and it has also a
minimum desired utility
(
)
(
)
0
ii
R
π
, called a
disagreement point. The disagreement point is the
minimum requirement that each user expects by
joining the game. There are m different service
types. Users who want to stay in this network should
select one of the service types and pay for allocated
resource according to the selected service type. The
network manager can discriminate service levels by
adjusting the bargaining power of each service
type
(
)
1
(, , )
m
ββ β
= "
. However, the network
manager does not announce the adjusted bargaining
power because it is internal decision of the network
manager. The bargaining power
of user i (
i
α
) is
determined when the user selects a service type.
3 SERVICE DISCRIMINATION
STRATEGIES
In this section, the procedure network manager to
discriminate services with bargaining power.
Adjusting the bargaining power is conducted based
on the result of service selection of users.
3.1 Efficiency based Strategy
Based on the result of service type selection, the net-
work manager adjusts its service discrimination
policy. The bargaining power is the only one that the
network manager can change. The efficiency, the
performance measure of the system, can be
calculated with the ratio between actual profit and
service selection and expected profit. The expected
profit can be derived from the bargaining power of
each service type because it can be said that the
network manager already planned to allocate a
certain amount of resources,
M
AX
j
R
β
, to the
j
th
service type. Therefore, considering the system
performance with the resource allocation results,
utility function of network manager can be defined
as following equation (1):
()
**
11
min min
1, 1,
nn
ijij iij
ii
j
MAX MAX
jj j
R
Cx Rx
EF
RC R
β
ββ
==
==
⎛⎞⎛⎞
⎜⎟⎜⎟
⎜⎟⎜⎟
⎜⎟⎜⎟
⎝⎠⎝⎠
∑∑
(1)
Hence the network manager should adjust the
resource allocation policy to maximize the system
efficiency. The optimization problem of the network
manager can be expressed as follows:
()
()
{}
1
1
max
. 1, 0< , 1,...,
m
jj
j
m
jj
j
EF EF
s
tjm
ββ
ββ
=
=
=
=∀∈
∏
∑
(2)
3.2 Stepwise Service Discrimination
The optimal solution of problem (2) can be found by
using Algorithm 1. Algorithm 1 guarantees the
optimal solution of problem (2) and it can be proved
as follows. First, as
*
1
n
iij
i
Rx
=
∑
and
M
AX
R
have nothing
to do with the decision variable
j
β
, the optimization
problem (2) can be simplified to (3). At this time, it
is assumed that
1
m
M
AX
j
j
aR
=
≤
∑
and
1
j
j
aa
+
≤
.
{}
1
1
max
. ,0< , 1,...,
m
j
j
j
m
MAX
jj
j
a
b
s
tbR bj m
=
=
=∀∈
∏
∑
(3)
DYNAMIC SERVICE DISCRIMINATION STRATEGY DEVELOPMENT USING GAME THEORY
283
Algorithm 1. Stepwise Service Discrimination.
1) Calculate amount of the allocated resources for the
each service type
{}
*
1
, 1,...,
n
iij
i
R
xj m
=
⎛⎞
∀=
⎜⎟
⎝⎠
∑
2) Set the order vector of service types (
SEQ
) based
on the amount of allocated resources
3) if
[1] [ 1]SEQ j SEQ m≤≤ −
,
'
1
n
iij
t
i
j
MAX
R
x
R
β
=
=
∑
,
4) else
1
'
1
'
m
M
AX t MAX
j
j
t
m
MAX
RR
R
β
β
−
=
−
=
∑
The optimal solution of the problem is that
*
,1 1
jj
ba jm=≤≤−
and
1
*
1
m
MAX
mj
j
bR b
−
=
=−
∑
.
Let
()
1
,...,
m
bb b=
be a feasible solution. If
(
)
(
)
*
zb zb≤
is established, then it can be said that
*
b
always becomes the optimal solution. First of all, it
can be assumed that
{
}
,1,...,1
jj
baj m≥∈ −
and there
exists at least one
j
b
meet
{
}
, 1,..., 1
jj
baj m>∈ −
from
the Lemma 1.
Lemma 1.
If
ii
ab<
and
j
j
ab<
are established,
ij
bb≤
can be assumed without loss of generality.
Let
j
j
ab→
and
ij j i
bb a b+−→
, the following
equation becomes true.
()
()()
0
ij i j j j
ji j i ji j j
bb b b a a
bb b a ab b a
−+−
=+−−+−>
(4)
In order to make the proof simple and readers
easily understood, let the number of service types be
two. Then it can be said that
12
MAX
Rbb=+
,
12
aa
<
,
and
12
M
AX
aa R+<
. If
11
ab<
, following inequality (5)
should be true.
()
1212
121
1
min ,1 min ,1
MAX
aaaa
bba
R
a
⎧⎫ ⎧⎫
×<
⎨⎬ ⎨⎬
−
⎩⎭ ⎩⎭
(5)
And assuming
22
ab≥
makes the following
inequality true.
()()
12
12
11212
121
21
min ,1 min ,1
1
MAX MAX
aa
bb
aaaaa
baa
Ra Ra
⎧⎫ ⎧⎫
×
⎨⎬ ⎨⎬
⎩⎭ ⎩⎭
=×= <
−−
(6)
It is the reason that Lemma 1 makes the
following equation (7) established.
()()
()
()
22 11
1221
0
MAX MAX
MAX
R
aa R aa
Raaaa
−− −
=−− −>
(7)
And then, assuming
22
ab<
and
12
ab<
become
established from the condition,
12
aa<
. As with the
case of
22
ab≥
, the following equation is established
from Lemma 1.
()
12
12
12 1 2 1 2
12 1 1
1
1
min ,1 min ,1
MAX
MAX
aa
bb
aa a a a a
bb b a
Rb
R
a
⎧⎫ ⎧⎫
×
⎨⎬ ⎨⎬
⎩⎭ ⎩⎭
=×=× <
−
−
(8)
Therefore, it is proved that the following solution
is the optimal solution of problem (3).
*
1
*
1
11
j
m
j
MAX
k
k
ajm
b
Rbjm
−
=
≤≤ −
⎧
⎪
=
⎨
−=
⎪
⎩
∑
(9)
3.3 Profitability based Strategy
Along with the efficiency of resource allocation
policy, the network manager should also consider
the unit price of each service type. Generally it is
more beneficial to adjust bargaining power in order
to induce users to get together in the more expensive
service type. Therefore, the price ratio of each
service type
(
)
1
m
j
jj
j
R
CC C
=
=
∑
should be considered
to adjust the bargaining power.
Combining these two service discrimination
strategies can be the overall strategy as following
equation (3). And weight factor, (
ζ
), means the
weight of profitability compared to the efficiency.
1'
(1 ) , 0 1
tt
jjj
RC
βζ ζβζ
+
←
⋅+− ≤≤
(10)
4 RESOURCE ALLOCATION
In this section utility function of users and resource
allocation algorithm will be explained.
4.1 Utility Function for Users
The utility function of each user,
i
π
, can be defined
by summing noise ratio and the cost factor.
(
)
()
()
()
()
()
0
0
1
00
(()) (())
iii iii i ii
m
iii i
ii i jij
j
iii i i
X
xNoiseRatioRx COSTRx
kRx R
Rx Cx
DRx R
πτ
τ
μ
=
== +
−
=+
−+
∑
(11)
The parameter
i
τ
is a term to adjust the scale of
cost factor to distortion rate factor. Since it means
the degree of cost-sensitivity, it has negative value.
The first part of the function,
NoiseRatio, is
designed based on the distortion rate model
(Stuhlmüller
et al., 2000), which is well suited for
ICAART 2010 - 2nd International Conference on Agents and Artificial Intelligence
284
the multimedia network (Andreopoulos
et al., 2004).
In addition, the cost factor added to the noise ratio
part.
4.2 Resource Allocation: KSBS
The criteria for bargaining solution to allocate
resources to users are needed. Multiple bargaining
solutions which have different properties can be
found in prior researches dealing with resource
management problems. And they provide
consideration of optimality and fairness (Monderer
& Shapley, 1996; Andreopoulos
et al., 2004).
Specifically KSBS guarantees the same quality drop
from each user’s maximum achievable utility (Kalai
& Smorodinsky, 1975). The generalized KSBS can
be obtained by the following equation (12).
1
11
n
M
AX MAX
nn
X
X
XX
δ
αα
==="
(12)
However, this equation is generally an
n
th
degree polynomial of
δ
. Hence, efficient and
simple numerical methods like the bisection method
is required (Boyd & Vandenberghe, 2004). Because
the upper and lower bounds are already known, the
bisection method can be applied. After finding the
optimal utility of the first user, it is easy to calculate
the others’ optimal utilities.
It can be said that finding the optimal resource
allocation plan using KSBS means finding the
maximum value of
δ
. It is possible to obtain the
optimal resource allocation plan with the reverse
function of the utility function.
()
*1*1*
1
m
MAX
iiii i jij
j
RX X x
ππδ β
−−
=
⎛⎞
=⋅
⎜⎟
⎝⎠
∑
(13)
As described earlier, the optimal solution should
meet three different constraints
1
n
iMAX
i
RR
=
≤
∑
,
1
m
ijiji
j
R
Cx b
=
≤
∑
and
(
)
0
M
AX
iii
RRR≤≤
.
4.3 Utility based Service Selection
Decision problems of users, which service type
should be selected, is absolutely based on the utility.
If all users try to change service type at the same
time, the resource allocation plan cannot be ensured.
Therefore it should be assumed that only one user
can change the service type at time and implement
the
Elementary Stepwise System (ESS), where each
user decides their service type sequentially. It has
already proved that the ESS converges to Nash
Equilibrium in polynomial time (Park & Schaar,
2007-2). The order to change the service type is
determined based on the utility status, the difference
between maximum required utility and current
derived utility.
5 CONCLUSIONS
Different from current related researches, this paper
assumed multiple service types and presented
service discrimination algorithm which can be
actively determined by the network manager.
Moreover, users’ utility function includes both
concepts of quality and cost of service. Also, this
paper suggested an efficient resource allocation
algorithm which considers both the network manger
and users.
Considering the concept of “traffic classes”, it
seems that discriminated services can be released
over the short haul when the number of users rapidly
increases, although a flat sum system is the most
general way in the multi-media services such as
Wibro, DMB, and IPTV. Likewise, the proposed
approach can be applied when there are multiple
multimedia servers and cost factor of utility function
can be substituted with channel status according to
the distance.
ACKNOWLEDGEMENTS
This work was supported by the IT R&D program of
MKE/IITA. [2008-F-005-02, Game Theoretic
Approach for Cross-layer Design in Wireless
Communications]
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