TY - JOUR
ID - 5399
TI - Generalized $G$-Wolfe type fractional symmetric duality theorems over arbitrary cones under $(G,\rho,\theta)$-invexity assumptions
JO - International Journal of Nonlinear Analysis and Applications
JA - IJNAA
LA - en
SN -
AU - Dubeya, Ramu
AU - Kumar, Rajnish
AU - Alam, Khursheed
AU - Mishra, Vishnu Narayan
AD - Department of Mathematics, J.C. Bose University of Science and Technology, YMCA, Faridabad-121006, Haryana, India
AD - Department of Mathematics, Noida Institute of Engineering & Technology, Greater Noida, India
AD - Department of Mathematics, School of Basic Sciences and Research, Sharda University, India
AD - Department of Mathematics, Indira Gandhi National Tribal University, Lalpur, Amarkantak, Anuppur -484 887, Madhya
Pradesh, India
Y1 - 2021
PY - 2021
VL - 12
IS - Special Issue
SP - 643
EP - 651
KW - Fractional programming problem
KW - symmetric duality
KW - theta)$-invexity
KW - $G$-Wolfe model
KW - $(G
KW - rho
KW - theta)$-pseudoinvexity
DO - 10.22075/ijnaa.2021.5399
N2 - In this paper, we introduce the concept of $(G,\rho,\theta)$-invexity/pseudoinvexity. We formulate duality outcomes for $G$-Wolfe-type fractional symmetric dual programs over arbitrary cones. In the final section, we discuss the duality theorems under $(G,\rho,\theta)$-invexity/ $(G,\rho,\theta)$-psedoinvexity assumptions.
UR - https://ijnaa.semnan.ac.ir/article_5399.html
L1 - https://ijnaa.semnan.ac.ir/article_5399_6678ec877f81ca13328050c5d16840c9.pdf
ER -