التفاصيل البيبلوغرافية
| العنوان: |
A class of higher-order symmetry duality in vector optimization problem under strongly higher-order (Q, T, τ, ϑ, e)-pseudoconvexity assumptions. |
| المؤلفون: |
Singh, Kuldeep, Kumar, Arvind, Tiwari, Awanish Kumar, Singh, Teekam, Dubey, Ramu |
| المصدر: |
Nonlinear Studies; 2022, Vol. 29 Issue 3, p677-685, 9p |
| مصطلحات موضوعية: |
SYMMETRY, NONLINEAR equations, PSEUDOCONVEX domains, CONES, GENERALIZATION |
| مستخلص: |
In this article, we studied a new types of classes of higher-order (Q, T, τ, ϑ, e)-pseudoconvex functions and strongly higher -order (Q, T, τ, ϑ,e)-pseudoconvex functions those generalizations of the higher-order (Q, T, τ, ϑ, e)-pseudoconvex functions presented in the previous research papers. New type of higher-order symmetric dual multiobjective nonlinear problems formulate over arbitrary cones. In addition,appropriate duality results derive with higher-order (Q, T, τ, ϑ, e)-pseudoconvex functions and strongly higher-order (Q, T, τ, ϑ, e)-pseudoconvex functions over arbitrary cones. [ABSTRACT FROM AUTHOR] |
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| قاعدة البيانات: |
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