一种高效的矩形套裁排样的带填充排样算法

提出一种带填充排样算法,实现矩形毛坯套裁排样。该算法首先用水平剪切线将板材分层,每层的宽度和板材宽度相同,高度和层最左端的主毛坯高度相同;通过调用两个递归过程确定最优排样方式,第一个过程确定每层左端的主毛坯,第二个过程确定层右端区域的毛坯排列方式。采用分支定界技术缩小搜索空间。实验计算结果说明所述算法比文献中最近报道的几种算法都有效。     

矩形毛坯最优层排样方式的动态规划算法*

讨论矩形毛坯无约束二维剪切排样问题,提出层排样方式的动态规划算法,使板材所含毛坯总价值最大。排样时使用一组平行的剪切线将板材分割为多个层,层的长度等于板材的长度或宽度,宽度等于最左边主毛坯的高度。通过动态规划算法确定所有可能尺寸层的最大价值和板材中层的最优组合。实验结果表明,该算法在满足实际应用要求的同时,板材利用率和计算时间两方面都较有效。     

基于曲率匹配和递归排序的自适应排样算法

为提高盘状毛坯的使用率,提出一种口腔修复加工中模型边界在盘状毛坯中的排样算法,主要包括边界匹配、多边形定位及递归排序.首先基于协方差矩阵及矩阵SVD分解算法对模型多边形进行分段,并采用等弧长曲线采样曲率匹配确定待匹配模型边界;然后依毛坯边界角度分布及沿圆周排样的思想确定模型轮廓的旋转和平移定位;最后提出一种基于包络率的递归排序算法,对在排样过程中发现的大孔洞可动态地调整排样顺序.实验结果表明,该算法可以处理不规则模型边界在任意形状毛坯中的排样,能有效地降低加工成本.     

长板单一尺寸矩形毛坯定长分割优化排样

讨论剪刃长度小于金属板材长度，单一尺寸矩形毛坯的优化排样问题。将长板分割成多块子板，除最后一块外，所有子板具有相同的长度与相同的毛坯排列。通过对Agrawal提出的单一尺寸矩形毛坯最优化排样方法进行扩展，使之适用于确定最优的子板长度，实验计算结果表明所述算法非常有效，给出例题数据的排样结果，并和企业的通常作法相比较，说明采用该方法的节材潜力。     

基于多阶排样方式的矩形件二维板材下料算法

针对二维剪切下料的特点,提出一种基于多阶排样方式的优化算法。递归构造多阶排样方式,称若干行若干列同种矩形件按照相同方向排列在一起形成的排样方式为0阶排样方式,n(n为正整数)阶排样方式由两个n-1阶排样方式沿着水平方向或竖直方向拼合而成。设计多阶排样方式的递归生成算法,按照阶数从小到大顺序生成多阶排样方式。将列生成算法与多阶排样方式生成算法相结合得到下料方案,按照板材使用张数最少原则确定下料方案中每个排样方式的使用次数。将这里排样方式分别与文献中的匀质条带三块排样方式、双排多段排样方式、简单块占角排样方式和递归四块排样方式进行对比,实验计算结果表明,多阶排样方式的排样价值高于以上4种排样方式。进一步地,将该下料算法与文献下料算法进行对比,实验结果表明该下料算法可提高板材利用率。     

同尺寸矩形毛坯最优排样动态递归剪切算法

为实现同尺寸矩形毛坯最优排样,该文提出了动态递归剪切算法。文章详细描述了该算法的基本设计思想、语言描述、实例求解;还完成了基于此算法的应用系统,并给出一例排样输出。     

生成矩形毛坯最优T形排样方式的递归算法

讨论矩形毛坯无约束两维剪切排样问题．采用由条带组成的T形排样方式，切割工艺简单．排样时用一条分界线将板材分成2段，同一段中所有条带的方向和长度都相同．一段含水平条带．另一段含竖直条带．采用递归算法确定分界线的最优位置以及每段中条带的最优组合．以便使下料利用率达到最高．采用大量随机生成的例题进行实验，结果表明该算法在计算时间和提高材料利用率2方面都较有效．     

单一尺寸矩形毛坯排样时长板的最优分割

讨论了存在剪刃长度约束时单一尺寸矩形毛坯的优化排样问题,将板材分割成多张子板,通过优化确定子板张数、各子板长度和毛坯在各子板上的排列,使事 板材中所含毛坯数达到最大;并对Agrawal提出的单一尺寸矩形毛了优化排样方法进行扩展,构造出一种分支定界方法,用于解决长板最优分割问题,实验计算结果表明,所述算法非常有效;最后给出了例题数据的排样结果,与企业的通常做法相比较,说明了采用本方法的节材潜力。     

生成匀质块排样方式的递推算法

讨论矩形毛坯有约束二维剪切排样问题:将一张板材剪切成已知尺寸的一组毛坯,使排样方式的价值(板材中所含毛坯的总价值)最大;排样方式中每种毛坯的数量不能超过需求量.采用匀质块排样方式,每刀都从当前板材上切下一根水平或竖直的同质条带,其中仅含相同尺寸的毛坯.采用动态递推算法生成匀质块排样方式,在保证解的质量的前提下,有效地缩短计算时间,达到节约材料的目的.     

简化同尺寸矩形毛坯排样方式的动态规划算法

同尺寸矩形毛坯排样方式的最优性包括毛坯数量最优性和切割工艺最优性。前者是指排样方式中所含毛坯数最大;后者是指在所有实现毛坯数量最优性的排样方式中,切割工艺最为简单。采用条带数衡量排样方式的复杂性,用动态规划算法生成条带数最少的最优排样方式。实验计算结果表明,所述算法能够明显简化下料工艺,对指导生产实践具有较重要的意义。     

A recursive branch-and-bound algorithm for the rectangular guillotine strip packing problem

A heuristic recursive algorithm for the two-dimensional rectangular strip packing problem is presented. It is based on a recursive structure combined with branch-and-bound techniques. Several lengths are tried to determine the minimal plate length to hold all the items. Initially the plate is taken as a block. For the current block considered, the algorithm selects an item, puts it at the bottom-left corner of the block, and divides the unoccupied region into two smaller blocks with an orthogonal cut. The dividing cut is vertical if the block width is equal to the plate width; otherwise it is horizontal. Both lower and upper bounds are used to prune unpromising branches. The computational results on a class of benchmark problems indicate that the algorithm performs better than several recently published algorithms.     

Logic based Benders' decomposition for orthogonal stock cutting problems

We consider the problem of packing a set of rectangular items into a strip of fixed width, without overlapping, using minimum height. Items must be packed with their edges parallel to those of the strip, but rotation by 90° is allowed. The problem is usually solved through branch-and-bound algorithms. We propose an alternative method, based on Benders' decomposition. The master problem is solved through a new ILP model based on the arc flow formulation, while constraint programming is used to solve the slave problem. The resulting method is hybridized with a state-of-the-art branch-and-bound algorithm. Computational experiments on classical benchmarks from the literature show the effectiveness of the proposed approach. We additionally show that the algorithm can be successfully used to solve relevant related problems, like rectangle packing and pallet loading.     

Reactive GRASP for the strip-packing problem

This paper presents a greedy randomized adaptive search procedure (GRASP) for the strip packing problem, which is the problem of placing a set of rectangular pieces into a strip of a given width and infinite height so as to minimize the required height. We investigate several strategies for the constructive and improvement phases and several choices for critical search parameters. We perform extensive computational experiments with well-known instances which have been previously reported, first to select the best alternatives and then to compare the efficiency of our algorithm with other procedures. The results show that the GRASP algorithm outperforms recently reported metaheuristics.     

Heuristic for constrained T-shape cutting patterns of rectangular pieces

T-shape patterns are often used in dividing stock plates into rectangular pieces, because they make good balance between plate cost and cutting complexity. A dividing cut separates the plate into two segments, each of which contains parallel strips, and the strip orientations of the two segments are perpendicular to each other. This paper presents a heuristic algorithm for constrained T-shape patterns, where the optimization objective is to maximize the pattern value, and the frequency of each piece type does not exceed the demand. The algorithm considers many dividing-cut positions, determines the pattern value associated to each position using a layout-generation procedure, and selects the one with the maximum pattern value as the solution. Pseudo upper bounds are used to skip some non-promising positions. The computational results show that the algorithm is fast and able to get solutions better than those of the optimal two-staged patterns in terms of material utilization.     

Heuristic for the rectangular strip packing problem with rotation of items

This paper presents a heuristic algorithm for the rectangular strip packing problem, where a set of rectangular items are packed orthogonally into a strip of definite width and infinite height, so as to minimize the required height. The items cannot overlap and rotation by 90 degrees is allowed. The solution contains several sections. The algorithm is based on a sequential grouping and value correction procedure that considers multiple candidate solutions. It generates each next section using a subset of the remaining items and then corrects the values of the included items. The algorithm is used to solve 13 groups of benchmark instances. It is able to improve the solution quality for all groups.     

二维板材切割下料问题的一种确定性算法

研究二维板材切割下料问题,即使用最少板材切割出一定数量的若干种矩形件。 提出一种结合背包算法和线性规划算法的确定性求解算法。首先构造生成均匀条带四块排样方 式的背包算法;然后采用线性规划算法迭代调用上述背包算法,每次均根据生产成本最小原则 改善目标函数并修正各种矩形件的当前价值,按照当前价值生成新的排样方式;最后选择最优 的一组排样方式组成排样方案。采用基准测题,将该算法与著名的T 型下料算法进行比较,实 验结果表明,该算法比T 型下料算法更能节省板材,计算时间能够满足实际应用需要。     

自适应分片算法研究

论文提出了一个自适应磁盘分片算法。首先,利用M/G/1排队理论对单个文件和整个阵列的平均存储响应时间建模,并提出了最优分片宽度理论计算公式;考虑到访问流之间的竞争,论文提出了一个磁盘分片的启发算法,它同时计算没有背景负荷和有背景负荷下访问流对应的磁盘优化分片,最终的磁盘分片是两者的结合;模拟试验表明自适应分片算法在四种分片算法中的性能最佳。     

生成最优单毛坯条带T型布局方式的精确算法

为解决大规模矩形件布局问题,提出一个生成单毛坯条带T型布局方式的精确算法。该算法不仅可在合理时间内取得好的优化结果,而且在满足实际下料工艺的同时化简了切割工艺。该算法首先确定最优单毛坯条带,然后通过求解一维背包问题确定单毛坯条带在级中的布局方式和级在段中的最优布局方式,最后选择两个最优段生成布局方式。通过文献中的63道基准测题,将该算法与5种著名算法(经典两阶段、普通T型、同质块两阶段、普通布局算法和启发式算法TABU500)进行了比较。实验结果表明,该算法在计算时间和材料利用率两方面都有效。