SOLVING FLOW-CONSTRAINED NETWORKS - INVERSE PROBLEM

被引:6
|
作者
ALTMAN, T [1 ]
BOULOS, PF [1 ]
机构
[1] MONTGOMERY WATSON, PASADENA, CA 91101 USA
来源
JOURNAL OF HYDRAULIC ENGINEERING | 1995年 / 121卷 / 05期
关键词
D O I
10.1061/(ASCE)0733-9429(1995)121:5(427)
中图分类号
TU [建筑科学];
学科分类号
0813 ;
摘要
Necessary and sufficient conditions for solving flow-constrained networks are developed. These conditions are predicated on the interrelation between the decision variables specified and the network-flow hydraulics. They are applicable to even-determined models of water-distribution systems. The decision variables are selected from a wide range of pipe-system parameters and are calculated explicitly to satisfy stated flow-equality constraints. A continuous-variable space is assumed for the solution. The determination of such conditions is important for comprehensive and effective modeling and optimization of water-distribution networks. These conditions can serve as guidelines to supplement existing procedures of network analysis.
引用
收藏
页码:427 / 431
页数:5
相关论文
共 50 条
  • [41] NUMERICAL ALGORITHMS FOR SOLVING THE INVERSE PROBLEM
    Huseynova, N. Sh.
    Orucova, M. Sh.
    Safarova, N. A.
    Hajiyeva, N. S.
    Rustamova, L. A.
    PROCEEDINGS OF THE 6TH INTERNATIONAL CONFERENCE ON CONTROL AND OPTIMIZATION WITH INDUSTRIAL APPLICATIONS, VOL I, 2018, : 191 - 193
  • [42] Solving the Mostar index inverse problem
    Yaser Alizadeh
    Nino Bašić
    Ivan Damnjanović
    Tomislav Došlić
    Tomaž Pisanski
    Dragan Stevanović
    Kexiang Xu
    Journal of Mathematical Chemistry, 2024, 62 : 1079 - 1093
  • [43] A method of solving the inverse problem of magnetostatics
    Pechenkov, AN
    Shcherbinin, VE
    RUSSIAN JOURNAL OF NONDESTRUCTIVE TESTING, 1999, 35 (10) : 789 - 790
  • [44] Solving the Inverse Problem with Inhomogeneous Universes
    Yoo, Chul-Moon
    Kai, Tomohiro
    Nakao, Ken-ichi
    PROGRESS OF THEORETICAL PHYSICS, 2008, 120 (05): : 937 - 960
  • [45] Solving the Mostar index inverse problem
    Alizadeh, Yaser
    Basic, Nino
    Damnjanovic, Ivan
    Doslic, Tomislav
    Pisanski, Tomaz
    Stevanovic, Dragan
    Xu, Kexiang
    JOURNAL OF MATHEMATICAL CHEMISTRY, 2024, 62 (05) : 1079 - 1093
  • [46] METHODS FOR INVERSE MAGNITOMETRY PROBLEM SOLVING
    Vasin, V. V.
    Akimova, E. N.
    Perestoronina, G. Y.
    Martyshko, P. S.
    Pyankov, V. A.
    SIBERIAN ELECTRONIC MATHEMATICAL REPORTS-SIBIRSKIE ELEKTRONNYE MATEMATICHESKIE IZVESTIYA, 2008, 5 : 620 - 631
  • [47] ALGORITHM FOR SOLVING INVERSE LIGENVALUE PROBLEM
    WILHELMI, W
    ZEITSCHRIFT FUR ANGEWANDTE MATHEMATIK UND MECHANIK, 1974, 54 (01): : 53 - 55
  • [48] A method for solving an inverse biharmonic problem
    Shidfar, A
    Shahrezaee, A
    Garshasbi, M
    JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 2005, 302 (02) : 457 - 462
  • [49] Inverse constrained bottleneck problems on networks
    Guan, XC
    Zhang, JZ
    COMPUTATIONAL SCIENCE AND ITS APPLICATIONS - ICCSA 2005, VOL 4, PROCEEDINGS, 2005, 3483 : 161 - 171
  • [50] Neural networks for solving second-order cone constrained variational inequality problem
    Juhe Sun
    Jein-Shan Chen
    Chun-Hsu Ko
    Computational Optimization and Applications, 2012, 51 : 623 - 648
12345