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基于两阶段的分段单一矩形优化排样 被引量:3

Two-stage segment optimal packing of single size rectangles
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摘要 为有效解决分段单一矩形优化排样问题,给出一个求解分段单一矩形优化排样问题的两阶段方法。第一阶段完成标准子段最佳排样方式求解,并将二维排样问题转化为一维下料问题,第二阶段使用适合于一维下料问题求解的算法完成板材最佳排样方式求解。使用该方法开发了一个单一矩形优化排样系统,该系统既可以解决分段单一矩形排样问题也可以解决其他类型的单一矩形优化排样问题。企业应用实例表明该方法是求解分段单一矩形优化排样问题的一个较为有效的方法。 A two-stage approach was proposed which can solve the optimal packing of single size rectangles effectively.The best cutting patterns of standard sub-segment were solved and the problem was transformed into one-dimensional cutting stock problems in the first stage.In the second stage the best ideal solution was found with different methods for the one-dimensional cutting stock problems.With this method,an optimal packing of single size rectangles system was developed.The system not only can solve the segment layout of single size rectangles but also can solve other kinds of optimal packing of single size rectangles.Enterprise applications show that this method is an effective solution to the problem of single size rectangles packing.
作者 姜永亮 杨志强 张诚一
机构地区 琼台师范高等专科学校信息技术系 黄淮学院国际关系学院 海南师范大学数学与统计学院
出处 《计算机应用》 CSCD 北大核心 2011年第6期1689-1691,共3页 journal of Computer Applications
基金 国家自然科学基金资助项目(70940007) 海南省重点科技基金资助项目(090802) 海南省自然科学基金资助项目(609001)
关键词 单一矩形 优化排样 多级排样 分段排样 分支定界算法 single size ractangle optimal packing multi-level layout segment layout branch and bound algorithm
分类号 TP391.72 [自动化与计算机技术—计算机应用技术]
  • 相关文献

参考文献7

  • 1DREMIN S Y, ZALGALLER V A. About cutting of a sheet into equal rectangles I J]. Optimization (in Russian), 1981,44(27): 136 - 142.
  • 2AGRAWAL P K. Minimizing trim loss in cutting rectangular blanks of a single size form a rectangular sheet using orthogonal guillotine cuts[ J]. European Journal of Operational Research, 1993, 64(3) : 410 - 422.
  • 3TARNOWSKI A G, TERNO J, SCHEITHAUER G. A polynomial time algorithm for the guillotine pallet-loading problem[ J]. Information Systems and Operational Research, 1994, 32(4) : 275 -287.
  • 4ARSLANOV M Z. Continued fractions in optimal cutting of a rectangular sheet into equal small rectangles[ J]. European Journal of Operational Research, 2000, 125(2) : 239 - 248.
  • 5崔耀东,张春玲,赵谊.同尺寸矩形毛坯排样的连分数分支定界算法[J].计算机辅助设计与图形学学报,2004,16(2):252-256. 被引量:21
  • 6崔耀东,周儒荣.单一尺寸矩形毛坯排样时长板的最优分割[J].计算机辅助设计与图形学学报,2001,13(5):434-437. 被引量:17
  • 7崔耀东.长板单一尺寸矩形毛坯定长分割优化排样[J].计算机工程,2004,30(7):178-180. 被引量:6

二级参考文献14

  • 1[1]Cheng C H, Feiring B R. Cutting Stock Problem--A Survey.International Journal of Production Economics, 1994,36(3): 291-305
  • 2[2]Wilt A V D. An Algorithm for Two-stage Unconstrained Guillotine Cutting. European Journal of Operational Research, 1995,84( 2): 494
  • 3[3]Agrawal K P. Minimizing Trim Loss in Cutting Rectangular Blanks of a Single Size Form a Rectangular Sheet Using Orthogonal Guillotine Cuts. European Journal of Operational Research, 1993,64(3): 410-422
  • 4Cheng C H,Int J Prod Econ,1994年,36卷,3期,291页
  • 5Cheng C H, Feiring B R, Cheng T C E. Cutting stock problem-A survey[J]. International Journal of Production Economics, 1994, 36(3): 291~305
  • 6Healy P, Creavin M, Kuusik A. An optimal algorithm for rectangle placement[J]. Operations Research Letters, 1999, 24: 73~80
  • 7Leung T W, Yung C H, Troutt M D. Applications of genetic search and simulated annealing to the two-dimensional non-guillotine cutting stock problem[J]. Computers & Engineering, 2001, 40: 201~214
  • 8Cung V D, Hifi M, Cun B L. Constrained two-dimensional cutting stock problems-A best-first branch-and-bound algorithm[J]. International Transactions in Operational Research, 2000, 7: 185~210
  • 9Dremin S Y, Zalgaller V A. About cutting of a sheet into equal rectangles[J]. Optimization, 1981, 44(27): 136~142(in Russian)
  • 10Agrawal P K. Minimizing trim loss in cutting rectangular blanks of a single size from a rectangular sheet using orthogonal guillotine cuts[J]. European Journal of Operational Research, 1993, 64(3): 410~422

共引文献35

同被引文献20

引证文献3

二级引证文献7

计算机应用
2011年 第6期

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