An exact algorithm for the N-sheet two dimensional single stock-size cutting stock problem
Abstract
The method introduced in this paper extends the trim-loss problem or also known as 2D rect-
angular SLOPP to the multiple sheet situation where N same size two-dimensional sheets
have to be cut optimally producing demand items that partially or totally satisfy the re-
quirements of a given order. The cutting methodology is constrained to be of the guillotine
type and rotation of pieces is allowed. Sets of patterns are generated in a sequential way.
For each set found, an integer program is solved to produce a feasible or sometimes optimal
solution to the N-sheet problem if possible. If a feasible solution cannot be identified, the
waste acceptance tolerance is relaxed somewhat until solutions are obtained. Sets of cutting
patterns consisting of N cutting patterns, one for each of the N sheets, is then analysed for
optimality using criteria developed here. This process continues until an optimal solution is
identified. Finally, it is indicated how a given order of demand items can be totally satisfied
in an optimal way by identifying the smallest N and associated cutting patterns to minimize
wastage. Empirical results are reported on a set of 120 problem instances based on well known
problems from the literature. The results reported for this data set of problems suggest the
feasibility of this approach to optimize the cutting stock problem over more than one same
size stock sheet. The main contribution of this research shows the details of an extension of
the Wang methodology to obtain and prove exact solutions for the multiple same size stock
sheet case
URI
http://hdl.handle.net/10394/18459http://dx.doi.org/10.5784/31-2-527
http://orion.journals.ac.za/pub/article/view/527