1) T monotone increasing operator
全序极小锥
2) strong minimal cone
强极小锥
1.
By means of the characteristics of strong minimal cone, some existence theorems for solutions are obtained.
考虑了Banach空间中形如x(t) =u(t) + ∫Gtf(t,s,x(s) )ds的广义Volterra积分方程 ,并利用强极小锥的性质 ,获得了以上方程的解的某些存在性结果 。
2.
In this paper,by using the character of strong minimal cone ,we obtain existence theorems of solutions for the nonlinear functional boundary value problem as following:x (n) -∑A i(t)x (i-1) =f(t,x,x′,.
利用“强极小锥”的概念 ,获得了Banach空间中的形如“x(n) - ∑Ai(t)x(i- 1) =f(t,x ,x′,… ,x(n- 1) ) (0 ≤t≤ 1) ,B(x ,x′,… ,x(n- 1) ) =θ”的非线性泛函边值问题的解的存在性结果 。
3.
Abstract In this paper, by using the character of strong minimal cone, we obtain existencetheorems of global solutions for the nonlinear impulsive Volterra integral equations in Banachspaces, that improve the corresponding results presented in [1-3].
本文利用“强极小锥”的概念,获得了Banach空间中非线性脉冲Volterra型积分方程整体解的存在性定理,改进了现有文献中的某些结果。
3) minimal conical surface
极小锥面
4) minimal cone
极小锥
5) Cone-Super minimum solution
锥-超极小解
6) global minimization
全局极小
1.
New branch and bound algorithm for nonconvex quadratic programming global minimization;
非凸二次规划全局极小问题的新型分枝定界算法
2.
The Filled Function Method is an approach for solving unconstrained global minimization problem.
填充函数是一种解无约束全局极小化问题的方法,这种方法的关键是构造填充函数。
3.
The filled function method is an approach for solving unconstrained global minimization problem.
填充函数法是一种解无约束全局极小化问题的方法。
补充资料:全良序集
全良序集
totally well-ordered set
全良序集[totauyw日I一闭ered滋;Bno几”e ynop,几o-,e皿oeM”o二ee化0」 见良序集(忱U一。找kredset).
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条