| DC Field | Value | Language |
|---|
| dc.contributor.author | Chernov, S. | |
| dc.contributor.author | Titov, S. | |
| dc.contributor.author | Chernova, L. | |
| dc.contributor.author | Kunanets, N. | |
| dc.contributor.author | Chernova, L. | |
| dc.date.accessioned | 2020-02-28T09:27:42Z | - |
| dc.date.available | 2020-02-28T09:27:42Z | - |
| dc.date.created | 2019-06-26 | |
| dc.date.issued | 2019-06-26 | |
| dc.identifier.citation | Determination of approaches for project costs minimization with use of dual problems / S. Chernov, S. Titov, L. Chernova, N. Kunanets, L. Chernova // Econtechmod : scientific journal. — Lublin, 2019. — Vol 8. — No 4. — P. 61–68. | |
| dc.identifier.uri | https://ena.lpnu.ua/handle/ntb/46296 | - |
| dc.description.abstract | For determining ways of company
development, ensuring the growth of profit in manufacture and
sales of certain products, it has been proposed to use an
algorithm of constructing a problem being inverse to primaldual one, for minimization of the project costs. The primal and
the inverse problems contribute to improving the efficiency of
calculation when determining approaches for minimization of
costs. This pair of problems is mutually conjugate. The proposed
rigorous approach to obtaining the algorithm of constructing a
dual problem is based on the following statement: a problem
being inverse to a dual one is a primal (original) problem. The
authors have proposed and rigorously proven the algorithm of a
general approach to the construction of conjugate problem pairs.
Formalization of the algorithm developed allows obtaining
easily correct pairs of known dual problems. This permitted
proposing and proving the truth of the algorithm of constructing
a dual problem for the arbitrary form of a primal problem representation. | |
| dc.format.extent | 61-68 | |
| dc.language.iso | en | |
| dc.relation.ispartof | Econtechmod : scientific journal, 4 (8), 2019 | |
| dc.subject | linear optimization | |
| dc.subject | primal problem | |
| dc.subject | dual problem | |
| dc.subject | duality | |
| dc.subject | objective function | |
| dc.subject | constraint system | |
| dc.subject | pairs of dual problems | |
| dc.title | Determination of approaches for project costs minimization with use of dual problems | |
| dc.type | Article | |
| dc.rights.holder | © Copyright by Lviv Polytechnic National University 2019 | |
| dc.rights.holder | © Copyright by University of Engineering and Economics in Rzeszów 2019 | |
| dc.contributor.affiliation | Admiral Makarov National University of Shipbuilding | |
| dc.contributor.affiliation | Lviv Polytechnic National University | |
| dc.format.pages | 8 | |
| dc.identifier.citationen | Determination of approaches for project costs minimization with use of dual problems / S. Chernov, S. Titov, L. Chernova, N. Kunanets, L. Chernova // Econtechmod : scientific journal. — Lublin, 2019. — Vol 8. — No 4. — P. 61–68. | |
| dc.relation.references | 1. Callahan K., Brooks L. 2004. Essentials of Strategic Project Management. John Wiley & Sons, Inc., Hoboken, NJ, USA. | |
| dc.relation.references | 2. Dinsmore P., Cabanis-Brewin J. 2014. The AMA Handbook of Project Management. Fourth Edition. Amacom Books, New York, NY, USA. | |
| dc.relation.references | 3. Grisham T. 2010. International Project Management: Leadership in Complex Environments. 1st Edition. John Wiley & Sons, Inc. Hoboken, NJ, USA. | |
| dc.relation.references | 4. A Guide to the Project Management Body of Knowledge. 2017. (PMBOK® Guide). Sixth Edition. Project Management Institute, Inc., Newtown Square, PA, USA. | |
| dc.relation.references | 5. Bushuev S. D., Bushuev D. A., Bushueva N. S., Kozyr B. Y. 2018. Information technologies for project management competences development on the basis of global trends // Information technologies and learning tools, Vol. 68, No. 6. | |
| dc.relation.references | 6. Danchenko E. B. 2011. A conceptual model of integrated management of deviations in the project // Project management in the development of society: Abstracts of The 8th International Conference. Kyiv, KNUBA, 68–70. | |
| dc.relation.references | 7. Friedmann O., Hansen T. and Zwick U. 2011. Subexponential lower bounds for randomized pivoting rules for the simplex algorithm, Proceedings of the 43rd annual ACM symposium on Theory of computing. New York, NY, USA. STOC’11, ACM, 283–292. | |
| dc.relation.references | 8. Friedmann O. 2011. A subexponential lower bound for zadeh’s pivoting rule for solving linear programs and games, Proceedings of the 15th international conference on Integer programming and combinatoral optimization. Berlin, Heidelberg. IPCO’11, Springer Verlag, 2011, 192–206. | |
| dc.relation.references | 9. Titov S. D., Chernova L. S. 2017. Higher and Applied Mathematics: Training Manual: In 2 Parts, Part 1. Kharkiv, Fakt, 336. | |
| dc.relation.referencesen | 1. Callahan K., Brooks L. 2004. Essentials of Strategic Project Management. John Wiley & Sons, Inc., Hoboken, NJ, USA. | |
| dc.relation.referencesen | 2. Dinsmore P., Cabanis-Brewin J. 2014. The AMA Handbook of Project Management. Fourth Edition. Amacom Books, New York, NY, USA. | |
| dc.relation.referencesen | 3. Grisham T. 2010. International Project Management: Leadership in Complex Environments. 1st Edition. John Wiley & Sons, Inc. Hoboken, NJ, USA. | |
| dc.relation.referencesen | 4. A Guide to the Project Management Body of Knowledge. 2017. (PMBOK® Guide). Sixth Edition. Project Management Institute, Inc., Newtown Square, PA, USA. | |
| dc.relation.referencesen | 5. Bushuev S. D., Bushuev D. A., Bushueva N. S., Kozyr B. Y. 2018. Information technologies for project management competences development on the basis of global trends, Information technologies and learning tools, Vol. 68, No. 6. | |
| dc.relation.referencesen | 6. Danchenko E. B. 2011. A conceptual model of integrated management of deviations in the project, Project management in the development of society: Abstracts of The 8th International Conference. Kyiv, KNUBA, 68–70. | |
| dc.relation.referencesen | 7. Friedmann O., Hansen T. and Zwick U. 2011. Subexponential lower bounds for randomized pivoting rules for the simplex algorithm, Proceedings of the 43rd annual ACM symposium on Theory of computing. New York, NY, USA. STOC’11, ACM, 283–292. | |
| dc.relation.referencesen | 8. Friedmann O. 2011. A subexponential lower bound for zadeh’s pivoting rule for solving linear programs and games, Proceedings of the 15th international conference on Integer programming and combinatoral optimization. Berlin, Heidelberg. IPCO’11, Springer Verlag, 2011, 192–206. | |
| dc.relation.referencesen | 9. Titov S. D., Chernova L. S. 2017. Higher and Applied Mathematics: Training Manual: In 2 Parts, Part 1. Kharkiv, Fakt, 336. | |
| dc.citation.volume | 8 | |
| dc.citation.issue | 4 | |
| dc.citation.spage | 61 | |
| dc.citation.epage | 68 | |
| dc.coverage.placename | Lublin | |
| Appears in Collections: | Econtechmod. – 2019. – Vol. 8, No. 4
|
