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Sufficient optimality condition and duality of nondifferentiable minimax ratio constraint problems under (p, r)-ρ-(η, θ)-invexity Cover

Sufficient optimality condition and duality of nondifferentiable minimax ratio constraint problems under (p, r)-ρ-(η, θ)-invexity

Control and Cybernetics
Volume 51 (2022): Issue 1 (March 2022)
By: Navdeep Kailey,  Sonali Sethi and  Shivani Saini  
Open Access
|Aug 2022

References

  1. Ahmad, I. (2003) Optimality conditions and duality in fractional minimax programming involving generalized ρ-invexity. International Journal of Statistics and Systems, 19, 165–180.
    Search in Google ScholarBack to article
  2. Ahmad, I., Gupta, S. K., Kailey, N., and Agarwal, R. P. (2011) Duality in nondifferentiable minimax fractional programming with B-(p, r)-invexity. Journal of Inequalities and Applications, 2011(1), 1–14.10.1186/1029-242X-2011-75
    Search in Google ScholarBack to article
  3. Ahmad, I. and Husain, Z. (2006) Optimality conditions and duality in nondifferentiable minimax fractional programming with generalized convexity, Journal of Optimization Theory Applications, 129(2), 255–275.10.1007/s10957-006-9057-0
    Search in Google ScholarBack to article
  4. Antczak, T. (2001) (p, r)-invex sets and functions. Journal of Mathematical Analysis and Applications, 263(2), 355–379.10.1006/jmaa.2001.7574
    Search in Google ScholarBack to article
  5. Antczak, T., Mishra, S. K. and Upadhyay B. B. (2018) Optimality conditions and duality for generalized fractional minimax programming involving locally Lipschitz (b, Ψ, Φ, ρ)-univex functions. Control and Cybernetics, 47(1), 5–32.
    Search in Google ScholarBack to article
  6. Boufi, K. and Roubi, A. (2019) Duality results and dual bundle methods based on the dual method of centers for minimax fractional programs. SIAM Journal on Optimization, 29(2), 1578–1602.10.1137/18M1199708
    Search in Google ScholarBack to article
  7. Du, D. Z. and Pardalos P. M. (1995) Minimax and Applications. Kluwer Academic Publishers.10.1007/978-1-4613-3557-3
    Search in Google ScholarBack to article
  8. Dubey, R. and Mishra, V. N. (2020) Higher-order symmetric duality in nondifferentiable multiobjective fractional programming problem over cone contraints. Statistics, Optimization and Information Computing, 8(1), 187–205.10.19139/soic-2310-5070-601
    Search in Google ScholarBack to article
  9. Falk, J. E. (1969) Maximization of signal-to-noise ratio in an optical filter. SIAM Journal on Applied Mathematics, 17(3), 582–592.10.1137/0117055
    Search in Google ScholarBack to article
  10. Husain, Z., Ahmad, I. and Sharma S. (2009) Second order duality for minimax fractional programming. Optimization Letter, 3(2), 277–286.10.1007/s11590-008-0107-4
    Search in Google ScholarBack to article
  11. Jayswal, A. (2008) Non-differentiable minimax fractional programming with generalized a-univexity. Journal of Computational and Applied Mathematics 214(1), 121–135.10.1016/j.cam.2007.02.007
    Search in Google ScholarBack to article
  12. Khan, M. A. and Al-Solamy, F. R. (2015) Sufficiency and duality in nondifferentiable minimax fractional programming with (Hp, r)-invexity. Journal of the Egyptian Mathematical Society, 23(1), 208–213.10.1016/j.joems.2014.01.010
    Search in Google ScholarBack to article
  13. Lai, H. C. and Huang, T. Y. (2012) Nondifferentiable minimax fractional programming in complex spaces with parametric duality. Journal of Global Optimization, 53(2), 243–254.10.1007/s10898-011-9680-7
    Search in Google ScholarBack to article
  14. Lai, H. C. and Lee, J. C. (2002) On duality theorems for a nondifferentiable minimax fractional programming. Journal of Computational and Applied Mathematics, 146(1), 115–126.10.1016/S0377-0427(02)00422-3
    Search in Google ScholarBack to article
  15. Lai, H. C. and Liu J. C. (2011) A new characterization on optimality and duality for nondifferentiable minimax fractional programming problems. Journal of Nonlinear and Convex Analysis 12(1), 69–80.
    Search in Google ScholarBack to article
  16. Lai, H. C., Liu, J. C. and Tanaka, K. (1999) Necessary and sufficient conditions for minimax fractional programming. Journal of Mathematical Analysis and Applications, 230(2), 311–328.10.1006/jmaa.1998.6204
    Search in Google ScholarBack to article
  17. Long, J. C. and Quan, J. (2011) Optimality conditions and duality for minimax fractional programming involving nonsmooth generalized univexity. Numerical Algebra, Control and Optimization 1(3), 361–370.10.3934/naco.2011.1.361
    Search in Google ScholarBack to article
  18. Liu, J. C. and Wu, C. S. (1998) On minimax fractional optimality conditions with (F, ρ)-convexity. Journal of Mathematical Analysis and Applications 219(1), 36–51.10.1006/jmaa.1997.5785
    Search in Google ScholarBack to article
  19. Mandal, P. and Nahak, C. (2011) Symmetric duality with (p, r)-ρ-(η, θ)-invexity. Applied Mathematics and Computation, 217(21), 8141–8148.10.1016/j.amc.2011.02.068
    Search in Google ScholarBack to article
  20. Schmitendorf, W. E. (1977) Necessary conditions and sufficient optimality conditions for static minmax problems. Journal of Mathematical Analysis and Applications, 57(3), 683–693.10.1016/0022-247X(77)90255-4
    Search in Google ScholarBack to article
  21. Son, T. Q. and Kim, D. S. (2021) A dual scheme for solving linear countable semi-infinite fractional programming problems. Optimization Letters, 1–14.
    Search in Google ScholarBack to article
  22. Sonali, S., Sharma, V. and Kailey, N. (2020) Higher-order non-symmetric duality for nondifferentiable minimax fractional programs with square root terms. Acta Mathematica Scientia, 40(1), 127–140.10.1007/s10473-020-0109-9
    Search in Google ScholarBack to article
  23. Tanimoto, S. (1981) Duality for a class of nondifferentiable mathematical programming problems. Journal of Mathematical Analysis and Applications, 79(2), 283–294.10.1016/0022-247X(81)90025-1
    Search in Google ScholarBack to article
  24. Zheng, X. J. and Cheng, L. (2007) Minimax fractional programming under nonsmooth generalized (F, ρ, θ)-d-univex. Journal of Mathematical Analysis and Applications, 328(1), 676–689.10.1016/j.jmaa.2006.05.062
    Search in Google ScholarBack to article
DOI: https://doi.org/10.2478/candc-2022-0005 | Journal eISSN: 2720-4278 | Journal ISSN: 0324-8569
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Language: English
Page range: 71 - 89
Submitted on: Jul 1, 2021
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Accepted on: Jan 1, 2022
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Published on: Aug 12, 2022
Published by: Systems Research Institute Polish Academy of Sciences
In partnership with: Paradigm Publishing Services
Publication frequency: 4 issues per year
Keywords:
minimax fractional programming,
optimality conditions,
duality,
generalized invexity
Related subjects:
Computer sciences,
Computer sciences, other,
Engineering,
Electrical engineering,
Fundamentals of electrical engineering,
Mechanical engineering,
Fundamentals of mechanical engineering,
Mathematics,
General mathematics

© 2022 Navdeep Kailey, Sonali Sethi, Shivani Saini, published by Systems Research Institute Polish Academy of Sciences
This work is licensed under the Creative Commons Attribution-NonCommercial-NoDerivatives 3.0 License.

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