A Comparison between Genetic Algorithms and Evolutionary Programming based on Cutting Stock Problem


Engineering Letters, 14:1, EL_14_1_14 (Advance online publication: 12 February 2007)
______________________________________________________________________________________
A Comparison between Genetic Algorithms and
Evolutionary Programming based on Cutting Stock Problem
Raymond Chiong, Member, IEEE, and Ooi Koon Beng, Member, IEAust
topic of research. Its applicability in many industries such as
Abstract Genetic Algorithms (GA) and Evolutionary
the steel, glass, wood, plastic and paper manufacturing has
Programming (EP) are two well-known optimization methods
caused CSP to be widely studied [1-2]. Besides that, CSP also
that belong to the class of Evolutionary Algorithms (EA). Both
seems to have shared similar structure with some other
methods have generally been recognized to have successfully
industrial problems like capital budgeting, processor
solved many problems in recent years, especially with respect to
scheduling, VLSI design, etc. [2]. The capacity of CSP in
engineering and industrial problems. Even though they are two
reflecting the diversity and complexity of the real world
different types of EA, the two methods share a lot of
commonalities in the genetic operators they use and the way they problems have definitely intensified the search for better
mimic natural evolution. This paper aims to bring forth an
heuristic solutions for it.
introductory review on how these two methods tackle the
The rest of this paper is organized as follows. Section II
one-dimensional Cutting Stock Problem (CSP). We draw
introduces the background theory of CSP, and describes some
comparison on the effectiveness of GA and EP in solving CSP, and
existing solution methods for it. Following which, section III
propose an improved algorithm using a combination of the two
and IV show introductory reviews on how CSP is being tackled
methods based on our observations. In the concluding remarks,
some future works are suggested for further investigations. by GA and EP based on [3] and [4] respectively. We then bring
forth some discussion by comparing the effectiveness of both
Index Terms Cutting stock problem, evolutionary
methods on CSP, and present an idea to improve the algorithms
programming, genetic algorithms, optimization methods.
in section V. Finally, section VI concludes with a summary of
this work together with some possible future works.
I. INTRODUCTION
II. CUTTING STOCK PROBLEM
Many problems in industrial engineering nowadays concern
The CSP is a combinatorial optimization problem that
themselves with the goal of an  optimal solution. Various
involves cutting larger stock sheets into smaller pieces.
optimization methods have therefore emerged, being
Generally, two problems arise when small items are to be cut
researched and applied extensively to different optimization
from large objects, which Hinxman [5] called the assortment
problems. For small scale problems, exact solution methods
problem and the trim loss problem. The assortment problem
such as linear programming can be used effectively. When the
deals with issue of choosing proper dimensions from large
problems are large and complex, however, heuristic methods
objects, whereas trim loss problem addresses the issue of how
have to be called into play due to the exponential growth of the
to minimize wastage in cutting out the smaller items from larger
search space and the time required to find optimal or near
objects. To understand it better, Fig. 1 below shows a simple
optimal solution. Over the past few decades, researchers have
illustration for the CSP.
proposed many novel nature inspired heuristic methods such as
the evolutionary algorithms (EA) for optimization design based
on specific domain knowledge. Two well-developed methods
belong to the class of EA are Genetic Algorithms (GA) and
Evolutionary Programming (EP). In this paper, we present a
study to illustrate the use of both GA and EP in tackling the
Cutting Stock Problem (CSP), and draw comparison on their
effectiveness in finding the optimal solution for CSP.
Fig.1. A simple illustration for CSP
As one of the classical optimization problems in Operational
Research, there are many reasons for CSP to be an interesting
From Fig. 1, we see that a stock sheet with fixed length of
100 is available. Given a set of requested items, each with
Manuscript received March 3, 2006.
certain length at 20, 30, 25 and 15 to be cut from the stock
Raymond Chiong is with the School of Information Technology, Swinburne
sheet, the wastage or trim loss will be 10. Here, the stock sheet
University of Technology (Sarawak Campus), State Complex, 93576 Kuching,
Sarawak, Malaysia (phone: +60 82 416353 ext 607; fax: +60 82 423594;
is referred to as the large object, and the set of requests is the
e-mail: rchiong@swinburne.edu.my).
so-called small items. If there is more than one stock sheet to be
Ooi Koon Beng is with the School of Engineering, Swinburne University of
cut to fulfill several sets of requests, the problem becomes more
Technology (Sarawak Campus), State Complex, 93576 Kuching, Sarawak,
Malaysia (e-mail: kooi@swinburne.edu.my).
complicated. The purpose of CSP is thus to find cutting patterns internal rules. However, by working on a solution set the
that could minimize the number of stock sheets used, and at the evolution process of EA has the risk of getting stuck at the local
same time minimize the wastage resulting from the trim loss. optima. In order to avoid this, EA have to explore the whole
Many solutions for CSP have been presented since 1960s, search space. When the search space is extremely large, the
and one of the pioneering solutions can be found in the work of computational time of the search will increase significantly.
Gilmore and Gomory based on a linear programming (LP) Some local searching methods therefore need to be
approach [6]. Gilmore and Gomory used an LP model with incorporated to speed up the convergence of EA s solutions [9].
delayed pattern generation technique to solve the trim loss There are many specific examples of EA, and most of them
problem efficiently without needing to enumerate all the are similar in nature but differ in the details of their
cutting patterns. Their technique is especially useful when implementation and the problem domains to which they have
some extremely large stock sheets with millions of possible been applied to. For the sake of brevity, in this paper we will
patterns need to be cut. Besides that, the delayed pattern not discuss all but concentrate merely on the use of GA and EP
generation technique is also potential of solving the trim loss in tackling the classical CSP.
problem in a much shorter time [7]. GA and EP are two important optimization methods in EA.
The LP approach of Gilmore and Gomory has subsequently Both have been used successfully to solve a great deal of hard
been adopted by many other researchers for various LP-based combinatorial optimization problems, and one of such is the
solutions (see [1] and [5] for more details), and most of them CSP. As two major classes of EA, the main difference between
have proven to be successful for CSP along the years. The GA and EP is that GA uses both crossover and mutation, with
limitation of LP-based approach, however, is that it focuses crossover as the primary search operator, while EP uses only
solely on minimizing trim loss [4]. When it comes to the real mutation without crossover. The existing works showed that
world problems which are mostly non-linear, the LP approach GA has been applied extensively to solve various kinds of
seems to be weak. As a result, researchers nowadays tend to CSPs, but the application of EP is relatively few [4].
show more interest on the innovative heuristic search methods. Nevertheless, most of the literature after the mid 1990s
To name just a few, some of the renowned heuristic considered EP to be much simpler, faster and more efficient
approaches include the best first search, simulated annealing, than GA [4, 10].
tabu search, etc. Unlike the LP approach, heuristic approach is Before we describe in details how GA and EP are used to
capable of dealing with both the assortment problem as well as solve the CSP, contiguity or pattern sequencing is another
the trim loss problem effectively. Moreover, heuristic approach important issue that we need to address. As small items need to
is more convenient in a way that it can produce integer be cut from large objects according to some specific patterns,
solutions without needing to solve the rounding problems the basic idea of contiguity is to ensure the sequence of cutting
which are common in the LP-based solutions. Nevertheless, patterns can minimize the items which are cut partially.
heuristic methods are normally very problem-dependent, thus For CSP without contiguity, the sequence of the patterns is
specific domain knowledge is required for finding good not a concern at all since changing the cutting sequence makes
heuristics. no difference to the optimization result. When a list of items is
Since the 1990s, the field of EA has experienced certain cut continually, however, we need to consider a queue where
degree of exponential growth. This is evidenced by a range of partially cut items can be stored and be reused until the
successful applications of EA in diverse fields such as requested number of items is completely cut. In large-size real
Engineering, Biomedical, Economics, Operational Research, world problems, the arrangement for contiguity issue is quite
Robotics, Social Sciences, Physics, Chemistry, etc. EA is a crucial. For that reason, the industry is trying hard to sequence
generic term used to describe computer-based problem solving the patterns in a way that the requested items could be cut in
methods based on the concept of biological evolution. They are continuous patterns as to minimize the handling costs.
search algorithms that maintain a population of structures and
evolve according to rules of selection as well as other genetic III. GENETIC ALGORITHMS FOR CUTTING STOCK PROBLEM
operators like crossover and mutation [8]. By incorporating
In this section, we will give an introductory review on how
problem-dependent knowledge using natural data structures
GA is used to tackle the CSP based on [3]. We consider CSP
and problem-sensitive genetic operators [9], EA can be an
with contiguity and also without contiguity. First, we address
extremely promising heuristic approach in finding optimal or
the problem representation on CSP using GA, and subsequently
near optimal solutions to complex combinatorial optimization
describe the search operators, the fitness function and the
problem such as CSP within reasonable computational time.
replacement strategy.
It is necessary to note that EA differ slightly from other
A. Problem Representation
heuristic approaches. One distinctive difference is that EA
In general, two representations can be found for solving CSP
work within a population or a solution set while other heuristic
using GA, namely the group-based representation and the
approaches use a single solution for optimization [9]. The clear
order-based representation. A group-based representation
advantage of EA over other methods here is that they are able to
refers to a selection of items that will be cut from stock sheet
handle a set of solutions and use their inductive nature to
with same stock length, and an encoder is used to map the
converge the solutions towards optimum without knowing the
groups. An order-based representation, on the other hand, operator. As a result, the first fit algorithm that is used for
focuses on the order of the items, and a decoder is used to group-based GA is also used for the order-based GA, and it has
organize the ordered list into a solution. According to [3], the been proven to be successful in [11]. Fig. 3 shows the mapping
group-based representation is more favourable to the solutions for order-based representation using a single stock
order-based representation for CSP without contiguity, and length.
they are comparable for CSP with contiguity. The main
An ordering list of items:
problem with order-based representation is that the crossover
operator in GA will find it hard to exploit the ordering
(10, 6, 5, 2, 15, 6, 5, 7, 6, 10, 5)
information in it. With ordering information encapsulated
Single stock length available:
within groups in the group-based representation, crossover can
work much better.
15
In GA with group-based representation, the chromosome is
Mapping Solutions
represented with a number of groups of items to be cut. A first
fit algorithm is normally used to group the items from the
Items Stock size to be used Wastage
requested list into groups which are considered as genes. To
(10) 15 5
(6, 5, 2) 15 2
form the group, a stock length is first chosen at random by the
(15) 15 0
encoder, and then the items to be cut are picked without
(6, 5) 15 4
replacement based on the first fit algorithm. It is necessary to
(7, 6) 15 2
(10, 5) 15 0
note that each group will be cut only from a single stock length.
As the stock length is implied by the group itself, it is not
Fig. 3. Mapping solutions for order-based GA
recorded in the chromosome. The smallest stock length from
which the group of items can be cut completely is mapped to
From the above illustration on group-based representation
each group, as showed in Fig. 2 below.
and order-based representation, we can see that the
A number of groups of items:
group-based is clearly a better choice with less wastage as
compared to the order-based. However, order-based
(10) (6, 5, 2) (15) (6, 5) (7, 6) (10, 5)
representation is essential especially when we need to deal with
Stock lengths available:
CSP with contiguity. This is because with contiguity the order
in the chromosome becomes significant. As such, Liang et al.
12, 13, 15
[4] proposed an intuitive algorithm in EP to solve this
Mapping Solutions
order-based problem in GA. EP will be discussed later in
section IV.
Items Stock size to be used Wastage
(10) 12 2
B. Reproduction Operators
(6, 5, 2) 13 0
With different representations, different search operators are
(15) 15 0
(6, 5) 12 1
used for optimizing the solutions. In this section, we describe
(7, 6) 13 0
the reproduction operators for CSP with and without contiguity
(10, 5) 15 0
separately.
For CSP without contiguity, Hinterding and Khan [3] used a
Fig. 2. Mapping solutions for group-based GA
grouping crossover and a group mutation with the group-based
GA. Their implementation on the crossover and mutation
The distinctiveness of the mapping solutions above is that
operators was based on [12]. The grouping crossover builds an
the number of groups, or genes, is variable [3]. Besides that, the
offspring by combining a segment of one parent into another
order of the groups and the order of items in each group have no
parent using an insertion point. In other words, the offspring
significance. These made the group-based GA very suitable for
inherits meaningful information from both the parents with the
CSP.
selection of best possible genes the parents have. The offspring
In GA with order-based representation, the chromosome is
is built by first copying the genes from one parent up to the
represented with an ordering list of all the items to be cut. A
insertion point. Then the genes from the segment in another
decoder is used to form groups from the ordering list based on a
parent are copied, followed with the genes after the insertion
given stock length. As the information of stock length is hard to
point from the first parent again. The grouping crossover,
identify in order-based GA, the stock length available is being
however, is not straightforward because the genes from parents
restricted to only one in [3]. Since the ordering of the items is a
have to be added to the offspring with some restrictions to
concern, a next fit algorithm that selects the next item that fits to
avoid duplicate items. As per the group mutation, a number of
form groups from the list of items is a good option. If the next
genes are chosen and deleted from time to time in order to form
item cannot fit into an existing group, next fit algorithm starts a
new genes in the chromosome. The deleted genes are normally
new group using that item. The only problem with next fit
those with greater wastage. The idea behind is to get rid of
algorithm is that it does not work well with the crossover
those bad genes in hope that the new genes produced would give faster and comparable results. As for the parameter setting,
provide a better solution. This mutation operator, however, is the replacement rate is set from 0 to 100%. Poisson distributed
more time consuming than the traditional simple swap random variable is used to determine the number of genes to be
mutation. mutated in a chromosome. A new chromosome is produced
For CSP with contiguity, Hinterding and Khan [3] used the either through crossover or mutation but not both at the same
uniform grouping crossover with the order-based GA based on time in order to know the separate effects of them.
[13]. The uniform grouping crossover gives more significance
to the ordering information which is essential in CSP with IV. EVOLUTIONARY PROGRAMMING FOR
CUTTING STOCK PROBLEM
contiguity. This crossover operator uses a template of binary
bits generated at random to exchange some items from both
Motivated by the fact that the performance of order-based
parents to an offspring while at the same time maintain the
GA is degraded when crossover is used, Liang et al. [4]
relative order information. As per the mutation, the remove and
proposed a new EP for CSP with and without contiguity based
reinsert mutation operator is used together with the group
on the classical EP in [9]. They used only mutation as the
mutation described earlier for swapping.
reproduction operator, thus their algorithm is considered to be
It is necessary to highlight again that the crossover used for
much simpler than GA. In this section, we will give an
GA is not a straightforward one, and its implementation is a
introductory review on how EP is used to tackle the CSP.
tricky and complicated task. It also costs a lot of computational
Similar to section III, we first address the problem
time, and immensely degrades the performance of GA in
representation on CSP using EP, and subsequently describe the
finding an optimal solution for CSP as a whole.
search operators, the fitness function and the replacement
strategy.
C. Fitness Function
A fitness function is an objective function that quantifies the A. Problem Representation
optimality of a solution. It is therefore crucial for us to describe
The EP proposed in [4] is indeed a very simple algorithm that
the fitness function used to evaluate the optimization results of
uses an order-based representation. In EP, the chromosome is
the CSP here. In this section, we present the fitness function for
represented with an ordering list of all items to be cut without
CSP with and without contiguity based on [3].
any additional parameter for self-adaptation being used. The
For the CSP without contiguity, the fitness function contains
cutting points for the ordering list are decided using a decoder.
two terms, with the first to reduce the wastage and the second to
According to [4], the principle of their EP is simply to make a
encourage solutions with fewer stock lengths that contain
cut before the accumulated item length matches any stock
wastage. The cost function can be calculated as below:
length or exceeds the available stock length. An example is
given below for better understanding towards the cutting
ëÅ‚ öÅ‚
1 waste number _ wasted
i
ìÅ‚ ÷Å‚
cost = +
process.
ìÅ‚1" ÷Å‚
,n
n stock _ length n
i
íÅ‚ Å‚Å‚ We assume the request for items to be cut is as follows:
where
2 items of length 3
n = number of groups
2 items of length 4
stock_lengthi = the stock length that groupi is to be cut
1 items of length 5
wastei = stock_lengthi  sum of items in groupi
3 items of length 6
number_wasted = number of stock lengths with wastage
A chromosome that is randomly generated can be
represented with an ordering list like this: (5, 4, 6, 3, 3, 4, 6, 6).
For the CSP with contiguity, the fitness function again
Given a single stock length of 12, the cutting solutions and the
contains two terms, with the first to reduce the wastage and the
total wastage are showed in Fig. 4 below.
second to maximize the contiguity by minimizing the number
of partially cut items. The cost function can be calculated as
below: An ordering list of items:
2
ëÅ‚ öÅ‚
(5, 4, 6, 3, 3, 4, 6, 6)
1 waste
partial _ items
ëÅ‚ öÅ‚
i
ìÅ‚ ÷Å‚
cost = " + 10
ìÅ‚ ÷Å‚
ìÅ‚1,n diff _ lengths ÷Å‚
10 + n stock _ length íÅ‚ Å‚Å‚
Single stock length available:
i
íÅ‚ Å‚Å‚
where
12
n = number of groups
stock_lengthi = the stock length that groupi is to be cut Mapping Solutions
wastei = stock_lengthi  sum of items in groupi
Items Stock size to be used Wastage
partial_items = number of partially cut items
| 5, 4 | 12 3
diff_lengths = number of different item lengths
| 6, 3, 3 | 12 0
| 4, 6 | 12 2
D. Replacement Strategy
| 6 | 12 6
The GA in [3] used a steady-state GA based on [13].
Tournament selection with a tournament size of 2 is used to
Fig. 4. Cutting solutions for EP with single stock length
In the situation when multiple stock lengths are available, the through the ordering list to find another stock sheet that cuts the
cutting process can be more complex. For example, if there are same length. Once such stock sheet is found, the removed stock
three stock lengths of 12, 15 and 22, the decoder has to compare sheet is reinserted behind it. Similar to the design of 3PS in
and decide on the best cutting points based on the three stock simple swap mutation operator, the number of SRI being used
lengths with the aim to minimize wastage. Fig. 5 shows the within one mutation needs to be devised properly.
cutting solutions for EP with multiple stock lengths.
C. Fitness Function
For the purpose of comparing the effectiveness of EP with
An ordering list of items:
GA, the fitness functions used for CSP with and without
contiguity in [4] are exactly the same as the ones used in [3],
(5, 4, 6, 3, 3, 4, 6, 6)
which have been described in the previous section.
Multiple stock lengths available:
D. Replacement Strategy
12, 15, 22
The EP used in [4] is a modified one from the classical EP
[9]. For CSP without contiguity, tournament selection is used
Mapping Solutions
with an initial population being randomly generated. Fitness
Items Stock size to be used Wastage
function is called with the cost value for individual in the
| 5, 4, 6 | 15 0
population being calculated. Each parent creates a single
| 3, 3, 4 | 12 2
offspring through mutation. Pairwise comparisons are made
| 6, 6 | 12 0
over the parents and offspring with opponent size of 10 for each
Fig. 5. Cutting solutions for EP with multiple stock lengths
individual. For each comparison, individual with cost lesser
than the opponent s survives and will be selected to be the
From the illustration in Fig. 5 above, it is obvious that with
parent for next generation. This replacement strategy is
the availability of multiple stock lengths, the wastage is
well-known for temporarily keeping some bad genes in order to
significantly reduced. However, the mechanism of finding the
maintain the diversity throughout the entire search procedure. It
best stock length for cutting can be complicated and needs to be
is necessary to note that the opponent size used has a direct
handled with extra care.
influence to the speed of convergence. As for CSP with
B. Reproduction Operators contiguity, the procedure is basically the same with CSP
without contiguity apart from that SRI is used together with
As mentioned before, the EP works without any crossover
3PS as the mutation operators.
operator. This is because Hinterding and Khan [3] have
observed that the crossover caused degradation in performance
V. COMPARISON AND DISCUSSION
of GA, especially for CSP with contiguity. As a result, only a
simple swap mutation is used by Liang et al. [4] in their The GA and EP that we have reviewed in the previous
proposed EP. It is necessary to note that their simple swap sections are two of the most significant optimization methods
mutation is different from the traditional mutation operator proposed for CSP with and without contiguity to date. From our
used in classical EP. The reason being that in CSP, the items in reviews, we see that the group-based GA has significant
the request list are unchangeable. What can be changed or advantage over the order-based GA, especially in the case of
mutated then is only the order of the items. CSP without contiguity. The crossover operator presents a
The simple swap mutation operator works based on a three major problem for the order-based GA, even though the
point swaps (3PS) which swaps three items in a list. For uniform grouping crossover has been proposed for better
example, the first item is swapped with the second item, and the performance in [3]. In some occasions, the crossover operator
new first item, which is originally the second item, is then used in order-based GA could even destruct the ordering
swapped with the third item in the list. The swapping of three information in the chromosome. We believe that the decoder
items in an ordering list may accelerate the convergence used for mapping the solutions after crossover takes place
towards the global optimum, if the original list is far away from could be harmful to the useful grouping information, thus
the global optimum. However, it may also hinder the making the crossover nothing more than a random swap.
convergence if the global optimum is already very close to the Realizing the importance of the ordering information and the
original list. A balance therefore needs to be maintained in the disadvantage of the crossover in order-based GA, EP has been
number of times the 3PS being applied in one mutation. presented in [4] with the aim of using mutation as the only
Apart from the swap mutation operator, a stock remove and search operator. A much simpler and less time-consuming
insert (SRI) operator is also being incorporated when it comes algorithm has thus emerged. Based on our observation, we
to CSP with contiguity. SRI is designed for the purpose of believe that EP outperforms GA because the reproduction
rearranging the cutting sequence in order to reduce the number operators used in EP for mapping the solutions are much more
of partially cut items. In SRI, an item is uniformly picked from heuristic and simpler than those used in GA. On the other hand,
the ordering list initially. The stock sheet that is used to cut the we have also found that the steady-state replacement strategy
selected item is then being removed. A search is performed used for GA in [3] has a good balance of replacement rate for
better convergence. ACKNOWLEDGMENT
Drawing from the comparison made between GA and EP, we
The authors would like to thank Professor Xin Yao from the
believe that a combination of the two methods can produce an
School of Computer Science, University of Birmingham, UK
improved algorithm for solving CSP. In EP, the SRI is
for his feedback. The authors would also like to thank Dr
deployed to gather together all the stock sheets that can be used
Argenes Siburian from the School of Engineering, Swinburne
for items with same length. As SRI operates based on groups,
University of Technology (Sarawak Campus) for his helps and
this mutation operator is still not able to gather items with the
comments.
same length into the same stock sheets for more contiguity. In
view of this restriction, we propose an order-based SRI
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We have also proposed an improve algorithm based on the
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combination of GA and EP, using the steady-state replacement
strategy and an order-based SRI mutation. We believe that our
proposed algorithm can improve the optimization results of
CSP significantly. As EA are heuristic in nature, finding good
design for the parameter settings is a major task and requires
substantial experience. Extensive experiments therefore need
to be done to verify our proposed algorithm and make it more
effective.
As a matter of fact, there are still a lot of rooms for
improvement in using EA to tackle CSP. One of such is to
investigate the use of self-adaptation for the evolution process
in applying the search operators. Self-adaptation is able to
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optimization process. Other than that, investigation on better
heuristics especially for the mapping process can also be
carried out.


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