Order-up-to Networked Policy for Periodic-Review Goods
Distribution Systems with Delay
Przemysław Ignaciuk
Institute of Information Technology, Lodz University of Technology, 215 Wólczańska St., 90-924, Łódź, Poland
Keywords: Inventory Control, Discrete-time Systems, Networked Control Systems, Time-delay Systems.
Abstract: In this paper, inventory control problem in goods distribution networks with non-negligible transshipment
delay is addressed. In contrast to the majority of earlier approaches, system modeling and policy design do
not assume simplified system structure, such as a serial, or a tree-like one. The network nodes, in addition to
satisfying market demand, answer internal requests with delay spanning multiple periods. The stock in the
network is refilled from uncapacited outside sources. A dynamic model of the considered class of goods
distribution systems is constructed and a new inventory policy is formulated. The proposed policy shares
similarity with the classical order-up-to one, yet provide improved performance owing to the networked
perspective assumed in the design process.
1 INTRODUCTION
The formal and computational difficulties have
directed the research effort in logistic system
optimization and control mainly to single stage
(Hoberg et al., 2007; Ignaciuk & Bartoszewicz,
2011), serial (Song, 2009, Movahed & Zhang,
2013), or tree-like configurations (Kim et al., 2005;
Ignaciuk, 2014). The new information and
communication technology advancements permit
now large-scale deployment of management
solutions in more complex – networked – settings.
However, as is the case of simplified structures
considered so far in the literature, the crucial aspect
behind the efficient operation and cost reduction in a
networked system is implementation of an
appropriate inventory control policy.
In this work, logistic networks with arbitrary,
mesh topology are considered in periodic-review
mode of operation. The stock replenishment orders
are realized with non-negligible lead-time delay that
may span multiple review periods. The external
demand is represented by uncertain, time-varying
functions, accepting any stochastic process typically
considered in inventory control problems. A
dynamic model of network node interactions is
constructed. Since the localized view of the goods
flow process reflected in the classical ordering
policies, e.g. order-up-to (OUT) one, may generate
significant cost increase in a real-world installation
(Cattani et al., 2011), an alternative – networked –
policy is proposed. The designed policy, while
sharing functional similarities with the classical one,
shows improved dynamical characteristics and
generates smaller costs.
2 PROBLEM SETTING
2.1 System Dynamics
The goods distribution system to be controlled
encompasses N nodes with the indices from the set
Ω
N
= {1, 2, ..., N}. The overall amount of goods in
the system is refilled from external sources. The set
of all node indices, including the controlled nodes
and external sources, Ω
M
= {1, 2, ..., M}, M ≥ N.
Let k = 0, 1, 2, ... be the independent variable
denoting subsequent review periods. The stock
balance equation at controlled node c, c ∈ Ω
N
:
goods delivered to node c
goods served by node
(1) () ()
() ()
MN
ccc
s
cc sc crr c
sr
c
xk xk dk
au k L au k T
∈Ω ∈Ω
+= −
+−−−
(1)
where:
x
c
(k) is the amount of goods (on-hand stock)
readily available at node c in period k;
498
Ignaciuk P..
Order-up-to Networked Policy for Periodic-Review Goods Distribution Systems with Delay.
DOI: 10.5220/0005561604980503
In Proceedings of the 12th International Conference on Informatics in Control, Automation and Robotics (ICINCO-2015), pages 498-503
ISBN: 978-989-758-123-6
Copyright
c
2015 SCITEPRESS (Science and Technology Publications, Lda.)
u
c
(k) is the amount of goods requested by node
c in period k to replenish its stock;
a
sc
is the part of the overall order u
c
(k) to be
acquired from node s ∈ Ω
M
by node c;
L
sc
= T
s
+ T
sc
is the lead-time delay in providing
the goods from node s to node c, L
sc
∈ {2, 3,
..., L}, L denotes the maximum lead-time
delay in goods transfer between any two
neighboring nodes;
T
s
is the order processing time at node s,
including all the activities related to preparing
the order for the requesting node, T
s
∈ {1, 2,
..., L – 1},
T
sc
is the time of transporting the goods from
node s to node c, T
sc
∈ {1, 2, ..., L – 1},
The (external) demand is modeled as an
uncertain, bounded function of time
0 ≤ d
c
(k) ≤
max
c
d
, where
max
c
d
≥ 0 denotes the upper
estimate of
d
c
(k). No assumption is taken regarding
the nature of stochastic process describing the
evolution of
d
c
.
Without loss of generality the network is
assumed connected (there is no isolated node) and
full order partitioning takes place, i.e.
1.
M
sc
c
s
a
∈Ω
=
∀
(2)
When treated as a graph, although arbitrary flow
orientation is permitted, the network is also assumed
directed, i.e. if a
sc
≠ 0, then a
cs
= 0 for c, s ∈ Ω
N
.
Moreover, for any c ∈ Ω
N
, a
cc
= 0, so that no
controlled node is a source of goods for itself.
According to (1), the goods to other nodes within
the controlled network are sent with at least one
period delay that covers the time to prepare all the
necessary documentation and shipment. Meanwhile,
the demand is served immediately in period k, which
implies that answering the external requests
(demand) takes precedence over the internal goods
traffic. Each node may serve the requests coming
from other nodes inside the managed network as
well as answer the external demand, which closely
reflects the actual real-life settings (Cattani et al.,
2011).
2.2 Classical Out Policy
In order to replenish the stock depleted according to
market demand (and internal requests) at a network
node, the OUT policy may be applied. When
demand forecasting is not used, the OUT policy
calculates the order quantities according to (Silver et
al, 1998):
1
() () (),
Msc
k
out
ccc scc
sjkL
uk x xk au j
−
∈Ω = −
=− −
(3)
where the sum represents the work-in-progress (the
order placed but not yet realized as a result of delay).
In the serial and tree-like topologies, it can be
shown that with sufficiently large
out
c
x
, for k > 0, the
orders generated by the OUT policy according to (3)
satisfy (Ignaciuk & Bartoszewicz, 2012)
() ( 1),
cc
uk dk=− (4)
i.e. the ordering signal issued in a current period
matches the demand from the previous one. In
consequence, the bullwhip effect is prevented.
Unfortunately, in the case of networked system with
full (mesh) connectivity this favorable property does
not hold. In order to mitigate the negative influence
of demand variability on the costs in the network,
one may apply alternative (local) strategies with
smoothing properties, e.g. (Ignaciuk, 2012), or, as is
proposed in this work, construct a new policy taking
into account the network dynamics.
3 NETWORKED MODEL
In order to formulate a networked inventory policy,
it is convenient to describe model (1) in an
appropriately chosen state space. The following
state-space representation is proposed:
1
(1) () ( )(),
L
j
j
kk kjk
=
+= + − −
xxBud
(5)
where:
x(t) = [x
1
(t) ... x
N
(t)]
T
is the vector of on-hand
stock levels inside the controlled network;
u(t) = [u
1
(t) ... u
N
(t)]
T
is the vector of stock
replenishment signals;
d(t) = [d
1
(t) ... d
N
(t)]
T
is the vector of demands
imposed at the controlled nodes with
d
max
= [
max
1
d
...
max
N
d
]
T
grouping the
information about the demand upper bounds;
matrices
1
1
1
112 13 1
:
21 2 23 2
:
31 32 3
:
1,
123
:
i
i
i
in
in
iL j
in
iL j
j
i
iL j
nn
nn n in
iL j
ab b b
bab b
bb a
b
bb b a
=
=
=
−
=
=
B
(6)
Order-up-toNetworkedPolicyforPeriodic-ReviewGoodsDistributionSystemswithDelay
499
for j = 1, ..., L hold the information about the node
interconnections; the elements on the main diagonal
reflect the goods acquisition with lead time j
(incoming shipments), whereas the off-diagonal
ones
, if ,
0, otherwise,
iw i
iw
aTj
b
−=
=
(7)
with w ∈ Ω
N
, correspond to the goods provision with
processing time j (the outgoing shipments inside the
network).
For further derivations, it is also convenient to
define
1
.
L
j
j =
=
BB
(8)
It follows from (2) that
B = I + E, where I denotes
an N × N identity matrix and
E is a hollow matrix
with entries a
ij
∈ [–1, 0] column-wise summing at
most to –1, is invertible.
4 NETWORKED OUT POLICY
4.1 Proposed Inventory Policy
Let x
d
= [
1
out
x
...
out
N
x
]
T
denote the vector of target
inventory levels. The proposed policy for the
considered goods distribution system establishes the
orders using the equation
1
1
() [ () ( )].
LL
j
iji
kkki
−
==
=−− −
d
uBxx Bu
(9)
4.2 Policy Properties
Assuming zero initial input, i.e. u(k) = 0 for k < 0,
from (5), the stock level in arbitrary period k > 0 can
be expressed as
11
10 0
11
10 0
() (0) ( ) ()
(0) ( ) ( ).
Lk k
i
ij j
Lki k
i
ij j
kjij
jj
−−
== =
−− −
== =
=+ −−
=+ −
xx Bu d
xBud
(10)
At the initial time,
u(0) = B
–1
[x
d
– x(0)].
Afterwards, for any k > 0, the ordering signal
satisfies the condition specified in the following
theorem.
Theorem 1. For k > 0, the stock replenishment
signal established according to (9) for system (5)
satisfies
u(k) = B
–1
d(k – 1). (11)
Proof. First note that (9) can be equivalently
written as
1
1
1
() [ () ()].
Lk
i
ijki
kk j
−
−
==−
=−−
d
uBxx Bu
(12)
Substituting (10) into (12), yields
11
1
10 0
() [ (0) () ()],
Lk k
i
ij j
kjj
−−
−
== =
=−− +
d
uBxx Bu d
(13)
and using (8),
11
1
00
() [ (0) () ()].
kk
jj
kjj
−−
−
==
=−− +
d
uBxxBu d
(14)
Then, applying (14),
u(k + 1) can be expressed as
1
00
11
1
00
1
111
(1) [ (0) () ()]
[(0) () ()]
[() ()]
() () () (),
kk
jj
kk
jj
kjj
jj
kk
kkkk
−
==
−−
−
==
−
−−−
+= − − +
=−− +
−−
=− + =
d
d
uBxxBud
Bx x B u d
BBu d
uBBuBd Bd
(15)
which ends the proof.
Let
1
() () ( ),
LL
j
iji
kk ki
==
=+ −
zx Bu
z ∈ ℝ
N
, (16)
which represents a network analogue of inventory
position (sum of on-hand stock and open orders).
Proposition 2. The dynamics of
z(t) can be
described by
(1) () ()().kkkk+= + −zzBud (17)
Proof. Taking into account the zero initial input,
directly from the definition of
z one obtains
z(0) = x(0). In turn, applying (5) to (17), yields
1
1
(1) (1) (1 )
(0) 0 (0) (0)
(0) (0) (0),
LL
j
iji
L
j
j
i
==
=
=+ −
=+−+
=+ −
zx Bu
xdBu
zBud
(18)
thus showing that (17) is satisfied in period k = 0.
Then, using (5), for arbitrary k > 0 the following
relation can be established
1
1
(1) (1) (1)
() ( ) () ()
() () (),
LL
j
iji
LL
j
iji
kk ki
kkikk
kkk
==
==
+= ++ +−
=+ −+ −
=+ −
zx Bu
xBuBud
zBud
(19)
which ends the proof.
ICINCO2015-12thInternationalConferenceonInformaticsinControl,AutomationandRobotics
500
Theorem 3. System (5) under the control of
policy (9) is bounded-input-bounded-output stable.
Proof. Since finite
u and x yield finite z, and d
influences (5) and (17) in the same way, the stability
assessment of both systems subject to policy (9) is
equivalent. Substituting
u(k) = B
–1
d(k – 1) into (17)
yields
(1) ()(1)(),kkkk+= + −−zzdd (20)
which implies that
z(t) (and thus x(t)) is bounded for
any bounded demand. This conclusion ends the
proof.
4.3 Selection of Target Stock Level
A successful control policy in modern supply
networks is expected to achieve a high service level.
In this work, the service level is quantified by the
demand fill rate, i.e. the part of imposed demand
realized from readily available resources at the
nodes. The fill rate is influenced by the choice of
target stock level. Owing to the overall complexity
of the networked system interconnections, the
optimal target stock
x
d
needs to be determined
through numerical computations for given network
parameters – demands imposed at the nodes and
inter-node lead time. Below, an intuitive procedure
to calculate
x
d
for minimizing backlog and thus
obtaining high fill rate is shown. The procedure
assumes only the knowledge about the demand
upper estimate
d
max
(not its statistical parameters).
It follows from Theorem 1 that steady-state
replenishment signal
u
ss
in response to steady-state
demand
d
ss
satisfies
1
.
−
=
ss ss
uBd
(21)
Then, using (9) and (21), the steady-state stock level
is determined as
1
1
1
1
1
.
Lk
i
ijki
L
i
i
L
i
i
i
i
−
==−
=
−
=
=− −
=− −
=− −
ss d ss ss
dssss
dssss
xx BuBu
xBuBu
xBBdd
(22)
In the worst case,
d
ss
= d
max
. Thus, setting
1
1
()
L
i
i
i
−
=
>+
dmax
xBBId
(23)
will result in reduced backlog.
On the other hand, in the absence of external
demand x
ss
= x
d
. It follows from the numerical
analysis presented in the next section that the
proposed policy provides oscillation and overshoot
free stock level evolution. Therefore, setting the
warehouse capacity at the network nodes equal to x
d
gives enough space to store the goods locally. The
stock level x(k) ≤ x
d
and costly emergency storage
outside the controlled network is not required.
5 SIMULATION EXAMPLE
Let us consider the goods distribution network
illustrated in Fig. 1. Nodes 1–5 are managed by a
single organization – they constitute the controlled
elements – while nodes 6–8 are the exogenous
sources used to replenish the stock inside the
network. Nodes 1 and 2 constitute the contact points
with the external market, responding to demands d
1
and d
2
. Nodes 3 and 5 serve as intermediate
suppliers and node 4 represents a distribution centre.
The arrows in the graph indicate the flow of goods.
With each connection there is associated a pair of
values (a
ij
, L
ij
): a
ij
denotes the fraction of stock
replenishment signal issued by node j for node i and
L
ij
is the delay in procuring orders from node i to j.
The processing time at each node equals one period.
Figure 1: Goods distribution system.
The initial condition x(0) = [80 80 60 60 60]
T
units and the target stock level, selected according to
(23) with d
max
estimate [20 20 0 0 0]
T
units as
x
d
= [125 100 80 110 50]
T
units. It is also assumed
that there is no goods in transit before the control
process commences, i.e. u(k) = 0 for k < 0.
The performance of proposed networked policy
(9) is compared with benchmark local policy (3).
The test proceeds in two phases: for k < 15 – the
Order-up-toNetworkedPolicyforPeriodic-ReviewGoodsDistributionSystemswithDelay
501
goods accumulation phase (from x(0) to x
d
) in the
absence of demand; for k ≥ 15 – reaction to the
highly variable, uncertain demand following the
Poisson process with mean equal to 15 units.
Table 1: Bullwhip indicator.
Policy
Network Local
Node 1 2 1 2
BI 0.974 1 1.024 1
The graphs depicted in Figs. 2 and 3 indicate that
both policies make the stock level converge to the
target value and, afterwards, follow the trend set by
mean demand. Local OUT policy (graph b) requires
larger safety stock to prevent backlog (occurring for
negative stock level) which translates to higher
holding costs with respect to the networked policy
(graph a). The local OUT policy also generates a
larger ripple in response to highly variable demand.
According to the bullwhip indicator (BI) data –
order-to-demand variance ratio (Chen et al., 2000) –
grouped in Table 1, the networked policy
successfully counteracts demand variations from
affecting the ordering signal.
6 CONCLUSIONS
The paper presents a new inventory control policy
for networked goods distribution systems. The
policy ensures stable system performance in the
presence of arbitrary delay in goods provision. The
proposed policy outperforms the classical OUT one
by avoiding oscillations and backlog, thus showing
the benefits of adopting networked perspective in
Figure 2: Control input: a) networked policy, b) local policy.
Figure 3: Stock level at the nodes: a) networked policy, b) local policy.
ICINCO2015-12thInternationalConferenceonInformaticsinControl,AutomationandRobotics
502
The paper presents a new inventory control policy
for networked goods distribution systems. The
policy ensures stable system performance in the
presence of arbitrary delay in goods provision. The
proposed policy outperforms the classical OUT one
by avoiding oscillations and backlog, thus showing
the benefits of adopting networked perspective in
control scheme design. However, the internal traffic
may still lead to the bullwhip effect. If order
smoothening is of priority, one should seek
alternative networked strategies. Also new, more
realistic measures of the bullwhip effect in the
networked environment should be developed.
ACKNOWLEDGEMENTS
This work has been performed in the framework of
project no. 0156/IP2/2015/73, 2015–2017, under
“Iuventus Plus” program of the Polish Ministry of
Science and Higher Education. The author holds the
Ministry Scholarship for Outstanding Young
Researchers.
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