Application of genetic algorithm to calculation of detonation parameters
-
摘要: 为解决爆轰参数计算中自变量取值范围要求严格以及收敛性差等问题,在最小自由能法的基础上,引入遗传算法建立了炸药爆轰参数的计算方法,并利用典型单质炸药和混合炸药的实验结果对计算结果进行了验证。结果表明:采用该方法计算得到的单质和混合炸药的爆速、爆压与实验测试结果基本一致,误差在5%以内,满足炸药性能预估的要求;该方法人工干预弱,只需一次性确定少数主要组分物质的量的变化范围,可适应于多配方优化计算。Abstract: To solve the problems of bad convergence and to satisfy the strict requirement to initial conditions in the calculation of detonation parameters, a new calculation method was proposed based on the principles of chemical equilibrium and the method of minimum free energy by introducing the genetic algorithm, and the calculated results of typical explosives were compared with the experimental data to verify the validity and the accuracy of the new method. It is demonstrated that, by the new method, the calculated results of detonation pressure and velocity of the explosives correspond well with the experimental data with the errors under 5%, which can be applied to predict explosive properties. Also, the computational process is convenient with little manual intervention and entails only the verification of the moles variation form of the few major ingredients, which may be used for multi-formula optimization design.
-
Key words:
- mechanics of explosion /
- genetic algorithm /
- minimum free energy /
- detonation parameters
-
表 1 不同炸药爆轰产物各组分的物质的量的计算结果
Table 1. Amount of substance calculted by different methods for different detonation products of different explosives
炸药 计算方法 x(Cs)/mol x(CO)/mol x(CO2)/mol x(H2O)/mol x(NH3)/mol x(H2)/mol x(N2)/mol TNT 遗传算法 22.651 0.920 7.252 10.993 0.006 0.004 6.601 平衡常数法 23.084 0.009 7.665 10.970 0.000 0.000 6.608 RDX 遗传算法 6.649 0.219 6.646 13.513 0.000 0.000 13.512 平衡常数法 6.564 0.000 6.564 13.216 0.000 0.000 13.216 HMX 遗传算法 6.721 0.059 6.724 13.502 0.001 0.000 13.504 平衡常数法 6.757 0.000 6.757 13.514 0.000 0.000 13.514 TATB 遗传算法 17.323 0.239 5.694 11.626 0.001 0.000 11.626 平衡常数法 17.428 0.000 5.809 11.619 0.000 0.000 11.619 TNT36/RDX64 遗传算法 12.474 0.346 6.925 12.610 0.001 0.001 11.025 平衡常数法 12.647 0.000 7.098 12.612 0.000 0.000 11.027 PETN50/
TNT50遗传算法 12.653 0.972 9.694 11.823 0.002 0.002 6.463 平衡常数法 13.140 0.000 10.178 11.829 0.000 0.000 6.465 HMX76.3/
TNT23.7遗传算法 10.524 0.214 6.871 12.912 0.000 0.000 11.868 平衡常数法 10.631 0.000 6.978 12.913 0.000 0.000 11.869 
下载: 导出CSV
表 2 不同方法得到的不同炸药的爆轰速度和爆轰压力
Table 2. Detonation velocity and pressure obtained by different methods for different explosives
炸药 Dexp/(km·s-1) pexp/GPa 计算方法 Dcal/(m·s-1) Dcal−DexpDcal/% pcal/GPa pcal−pexppcal/% TNT 6.950 19.5 遗传算法 7.064 1.6 20.2 3.6 平衡常数法 6.762 2.7 18.9 -3.1 RDX 8.754 34.7 遗传算法 8.875 1.4 35.0 0.8 平衡常数法 8.777 0.3 34.1 -1.5 HMX 9.100 39.3 遗传算法 9.287 2.1 40.6 3.3 平衡常数法 9.260 1.8 38.8 -1.3 TATB 7.860 31.5 遗传算法 8.234 4.7 32.0 1.6 平衡常数法 7.851 -0.1 28.9 -8.2 TNT36/
RDX648.030 29.4 遗传算法 8.186 1.9 29.0 -1.4 平衡常数法 8.046 0.2 27.4 -6.8 PETN50/
TNT507.465 24.8 遗传算法 7.718 3.4 24.5 -1.2 平衡常数法 7.532 0.9 23.4 -5.6 HMX76.3/
TNT23.78.476 34.3 遗传算法 8.695 2.5 34.3 0.0 平衡常数法 8.571 1.1 32.3 -5.8
下载: 导出CSV
-
[1] Mader C L. Numerical modeling of explosive and propellants[M]. 2nd ed. Florida: CRC Press, 1998:33-52. [2] Qiu Jianbin, Feng Gang, Gao Huijun. A new equation of state for detonation products[J]. Journal of Chemical Physics, 1981, 74(8):4634-4645. doi: 10.1063/1.441653 [3] 李德华, 程新路, 杨向东, 等.TNT和TATB炸药爆轰参数的数值模拟[J].兵工学报, 2006, 27(4):638-642. doi: 10.3321/j.issn:1000-1093.2006.04.014Li Dehua, Cheng Xinlu, Yang Xiangdong, et al. Numerical simulation of detonation parameters for TNT and TATB detonation products[J]. Acta Armamentarii, 2006, 27(4):638-642. doi: 10.3321/j.issn:1000-1093.2006.04.014 [4] Wu Xiong. Detonation performance of condensed explosives computed with the VLW EOS[C]//Proceedings of the Eighth Symposium (International) on Detonation. Albuquerque: Office of Naval Research, 1986: 796-804. [5] 吴雄, 龙新平, 何碧, 等.VLW爆轰产物状态方程[J].中国科学:B辑:化学, 2008, 38(12):1129-1132. http://cdmd.cnki.com.cn/Article/CDMD-82818-1011211247.htm [6] 周霖.爆炸化学基础[M].北京:国防工业出版, 2005:33-37. [7] 孙志艳, 潘功配, 陈宁, 等.底排药剂燃烧产气量的理论计算[J].弹箭与制导学报, 2006, 26(2):71-73. doi: 10.3969/j.issn.1673-9728.2006.02.025Sun Zhiyan, Pan Gongpei, Chen Ning, et al. Calculation of gaseous products quantity for base bleeding agent[J]. Journal of Projectiles, Rockets, Missiles and Guidance, 2006, 26(2):71-73. doi: 10.3969/j.issn.1673-9728.2006.02.025 [8] 周霖, 谢中元.含Cs盐推进剂燃烧产物导电特性研究[J].含能材料, 2009, 17(1):99-102. doi: 10.3969/j.issn.1006-9941.2009.01.024Zhou Lin, Xie Zhongyuan. Research on electrical conductivity of combustion production of composite propellant containing Cs salt[J]. Chinese Journal of Energetic Materials, 2009, 17(1):99-102. doi: 10.3969/j.issn.1006-9941.2009.01.024 [9] 张熙和, 云主惠.爆炸化学[M].北京:国防工业出版社, 1989:23-35. [10] 雷英杰, 张善文, 李续武, 等.Matlab遗传算法工具箱及其应用[M].西安:西安电子科技大学出版社, 2011:45-61. [11] Goldberg D E. Genetic algorithms in search, optimization and machine learnin[M]. Boston: Addison-Wesley Professional, 1989:1-25. [12] 谢中元, 周霖, 王浩, 等.遗传算法在推进剂燃烧产物组成计算中的应用[J].含能材料, 2015, 23(4):340-345.Xie Zhongyuan, Zhou Lin, Wang Hao, et al. Application of genetic algorithm in calculation of combustion equilibrium composition[J]. Chinese Journal of Energetic Materials, 2015, 23(4):340-345. [13] 范磊, 潘功配, 欧阳的华, 等.基于遗传算法结合支持向量机的Mg/PTFE贫氧推进剂配方优化[J].推进技术, 2012, 33(4):620-624. http://www.wanfangdata.com.cn/details/detail.do?_type=perio&id=tjjs201204022Fan Lei, Pan Gongpei, Ouyang Dehua, et al. Application of genetic algorithm-support vector machine in formula optimization of Mg/PTFE fuel rich propellant[J]. Journal of Propulsion Technology, 2012, 33(4):620-624. http://www.wanfangdata.com.cn/details/detail.do?_type=perio&id=tjjs201204022 [14] 安维中, 胡仰栋, 袁希钢.多相多组分化学平衡和相平衡计算的遗传算法[J].化工学报, 2003, 54(5):691-694. doi: 10.3321/j.issn:0438-1157.2003.05.020An Weizhong, Hu Yangdong, Yuan Xigang. Calculation of multiphase and multicomponent chemical equilibrium using genetic algorithm[J]. Journal of Chemical Industry and Engineering, 2003, 54(5):691-694. doi: 10.3321/j.issn:0438-1157.2003.05.020 [15] 陈朗, 龙新平.含铝炸药爆轰[M].北京:国防工业出版社, 2004:30-38. [16] 宁小蘶.炸药水下爆炸性能计算方法研究[D].北京: 北京理工大学, 2010: 10-21. -
推荐阅读
露天矿富水裂隙岩体台阶爆破的殉爆机理和防殉爆研究
费鸿禄 等, 爆炸与冲击, 2025
考虑壳体运动惯性约束效应的装药燃烧裂纹网络反应演化理论模型
教继轩 等, 爆炸与冲击, 2025
端到端机器学习代理模型构建及其在爆轰驱动问题中的应用
柏劲松 等, 爆炸与冲击, 2025
矩形管下气相螺旋爆轰的结构及传播方式
贾旭飞 等, 爆炸与冲击, 2024
模拟高原环境下敏化方式对乳化炸药爆轰性能的影响研究
陈正严 等, 高压物理学报, 2024
非均质炸药冲击起爆数值模拟研究现状综述
姚天子 等, 高压物理学报, 2025
扰动作用下爆轰形成机理
张静雯 等, 高压物理学报, 2022
Multifunctional electromagnetic wave absorbing carbon fiber/ti3c2tx mxene fabric with superior near-infrared laser dependent photothermal antibacterial behaviors
Lian, Yuanyuan et al., JOURNAL OF COLLOID AND INTERFACE SCIENCE, 2024
A modified a* algorithm for path planning in the radioactive environment of nuclear facilities
ANNALS OF NUCLEAR ENERGY, 2025
Optimization of low-power femtosecond laser trepan drilling by machine learning and a high-throughput multi-objective genetic algorithm
OPTICS AND LASER TECHNOLOGY, 2021
Powered by 
图(1) / 表(2)
计量
- 文章访问数: 4293
- HTML全文浏览量: 1330
- PDF下载量: 424
- 被引次数: 0