本文通过使用向量似变分不等式和半预不变凸函数来证明约束向量优化的弱极小值的存在性。
In this paper, We prove the existence of a weak minimum for constrained vector optimization problem by making use of vector variational-like inequality and semi-preinvex functions.
本文给出了等式约束与不等式约束的关系定理,解决了带等式约束的可能性线性规划问题。
In this paper, we give a relation between constrains with equality and inequality, and have solved the possibilistic Linear programme problems.
最后,利用择一性定理,获得了含不等式和等式约束的广义次似凸集值映射向量最优化问题的最优性条件。
Finally, the optimality conditions for vector optimization problems with set valued maps with equality and inequality constraints are obtained with it.
在部分生成锥内部凸-锥-凸映射下,得到了既有等式约束又有不等式约束的向量优化问题弱有效解的最优性必要条件。
Under the conditions of Partial ic-convex like Maps, optimality necessary conditions of weak efficient solutions for vector optimization problems with equality and inequality constraints are obtained.
运用此定理,在线性空间中建立了带广义不等式约束的向量极值问题的最优性条件。
By the alternative theorem, the optimality conditions of vector extremum problems with generalized inequality constraint are established in linear space.
研究球形约束变分不等式求解的算法,提出一种光滑化牛顿方法,证明了该方法具有全局收敛性和超线性收敛。
In this paper we present a smoothing Newton method for solving ball constrained variational inequalities. Global and superlinear convergence theorems of the proposed method are established.
本文研究了带有不等式约束的生长曲线模型中线性估计的容许性与泛容许性问题。
The Minimax admissibility of linear estimates with respect to restricted multivariate regression coefficient under matrix loss function is considered.
利用此定理,得到了带广义不等式约束的向量优化问题的最优性必要条件和充分条件。
In this paper, we mainly consider the existence of the generalized weakly efficient solution for Vector Optimization Problem.
利用此定理,得到了带广义不等式约束的向量优化问题的最优性必要条件和充分条件。
In this paper, we mainly consider the existence of the generalized weakly efficient solution for Vector Optimization Problem.
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