1) Dual fountain theorem
对偶喷泉定理
1.
With the aids of Dual fountain theorem,it can be obtained that this problem has many solutions with negative energy as λ∈(0,λ*),and the norm of the solutions behave near 0 asymptotically as λ→0+;for λ≤0,there is no solution with negative energy.
证明了具有Hardy-Sobolev临界指数的半线性椭圆方程(1)的解的情况,存在λ*>0,当λ∈(0,λ*)时,运用对偶喷泉定理得方程有无穷多解,且该解序列具有负的能量值;当λ→0+时,解的模趋于零;当λ≤0时,方程没有负能量的解。
2.
If f satisfies nonquadraticity condition,using variational methods,via dual fountain theorem,proved that there exists there exists λ*>0 such that for any λ∈(0,λ*),this problem has a sequence of solutions{uk}H10(Ω)such that I(uk)<0 and I(uk)→0 as k→+∞.
在f满足非二次条件的情况下,运用对偶喷泉定理证明了存在λ*>0,使得,当λ∈(0,λ*)时,该方程有无穷多个弱解{uk}满足I(uk)<0,并且I(uk)→0,k→+∞。
3.
Via the dual fountain theorem,when the parameter λ is small enough,1
通过对偶喷泉定理,证明了当参数λ很小且,1
2) fountain theorem
喷泉定理
1.
Moreover, by using the Fountain theorem of Bartsch, the existence of infinitely many solut ons with large energy for the equations are obtained.
在较弱的条件下,证明方程所对应的泛函满足Cerami条件,进而应用Bartsch 的喷泉定理,得到了方程无穷多个大能量解的存在性。
2.
Under the assumption that the linear part is not equivalent to 0,the existence of infinitely many nontrivial periodic solutions for the systems is proved with the variant fountain theorem in critical point theory,where F(t,u) satisfies a new super-quadratic condition and need not satisfy the global Ambrosetti-Rabinowitz c.
在线性项非零的假设下,当位势函数F满足新的超二次条件而不满足Ambrosetti-Rabi-nowitz条件时,运用临界点理论中喷泉定理证明此系统存在无穷多非平凡的周期解。
3) duality theorem
对偶定理
1.
At the same time,the weak duality theorems and strong duality theorems are proved for the three types of duality respectively based on the(F,α,ρ,θ)-b-convexity.
本文给出了一类新的广义凸函数-(F,α,ρ,θ)-b-凸函数,讨论了多目标分式规划(MFP)的三种对偶模型:Mond-Weir型对偶、Lagrange型对偶、Schaible型对偶,并基于(F,α,ρ,θ)-b-凸性证明了各自相应的弱、强对偶定理。
2.
In this paper, author gives a definition of ((F,ρ), invariant convex function, and discuses the duality theorems of the multiobjective programming.
本文给出了(F,ρ)-不变凸函数的定义,并讨论证明了在此定义下其多目标规划的对偶定理。
3.
Moreover, a parametric duality model and a semiparametric duality model are constructed and appropriate duality theorems are proved.
对该类多目标分式规划问题,引入了(F,α,ρ,d)-V-凸函数的概念,证明了有效解的充分条件和必要条件,构造出了一种参数对偶模型和一种半参数对偶模型,并证明了相应的对偶定理。
4) duality theorems
对偶定理
1.
A general form of a class of duality theorems was yielded.
研究右序对偶半序线性空间中两个不同的Mackey邻域的对偶,给出一类对偶定理的一般形式,削弱了关于序凸与可分解,绝对序凸与绝对控及正序凸与正控的对偶定理的某些条件并简化了其证明。
2.
Then we use the thought of the Lagrange duality progrmming for the solution-type linear bilevel programming and prove the basic duality theorems.
讨论了解型线性双层规划的对偶规划问题,利用Lagrange对偶规划的思想,建立了解型线性双层规划的Lagrange对偶规划,并证明了基本对偶定理。
3.
Appropriate duality theorems are proved.
给出了一类非线性分式规划问题的参数形式和非参数形式的最优性条件,在此基础上,构造出了一个参数对偶模型和一个非参数对偶模型,并分别证明了其相应的对偶定理,这些结果是建立在次线性函数和广义凸函数的基础上的。
5) dual theorem
对偶定理
1.
The present paper deals with dual theorem, functinal calculus, restriction and quotient operators; In particular, for Hilbert spaces, or L-spaces, it is proved that a n-tuple of commuting operators is spectral iff the operators in the n-tuple of commuting operators are spectral operators.
本文讨论Banach空间上谱型交换算子组的对偶定理、函数演算、限制和商。
6) generalized fountain theorem
广义喷泉定理
补充资料:函数逼近,正定理和逆定理
函数逼近,正定理和逆定理
approximation of functions, direct and inverse theorems
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