The fixed point theorems for generalized D-metric space are proved.
给出了D-度空间一组不动点定理。
The paper is to discuss the fixed point theorems for contractive type mappings in compact matric spaces, the results improve and extend the results of .
本文在紧度量空间中,讨论了压缩型映象的不动点问题,推广和改进了某些已知结果。
We utilize the results in Chapter 2 and Chapter 3 to prove the fixed point theorems and several corollaries for complex mappings or single mapping on fuzzy metric Spaces.
利用第二、第三章的结果证明了模糊度量空间上相应的复合映射的不动点定理和几个单一映射的不动点定理。
The fixed point theorems for mappings of contractive type and locally contractive type on WF-fuzzy metric Spaces, which extend several important fixed point theorems, are established.
在WF -模糊度量空间中建立压缩型和局部压缩型映射的不动点理论,推广一些重要的不动点定理。
The fixed point theorems for expansion mappings and the common fixed point theorem for a pair of mappings are given in 2 metric spaces under the condition of weakening mappings continuance.
在2—距离空间中减弱映射的连续性条件下,给出了扩张映射的不动点定理及扩张映射对的公共不动点定理。
In this paper, we mainly discuss the fixed point theorems of monotone mappings and the solvability of a class of nonlinear operator equations in partially ordered F-type topological Spaces.
本文主要研究半序f -型拓扑空间中单调映射的不动点定理和一类非线性算子方程的可解性。
Using fixed point theorems, in this paper we give sufficient conditions of the existence of bounded mild pseudo almost periodic solution for some semilinear differential equations.
利用不动点理论,给出了一类半线性微分方程有界的调和伪概周期解存在的充分条件。
We obtain the existence of positive solutions of BVP (3.1.1) and the existence interval of positive solutions of BVP (3.1.2), by using fixed point index theorems.
通过使用不动点指数定理,我们得到了问题(3.1.1)正解的存在性以及问题(3.1.2)正解的存在区间。
The aim of the present paper is to establish three common fixed point theorems in probabilistic metric Spaces.
本文的目的是在概率度量空间建立三个公共不动点定理。
In this paper, we discuss the existence of fixed point for nonlinear mappings in product Spaces and give some new fixed point theorems.
本文在乘积空间中讨论一类非线性映象的不动点的存在性,得到了一些新的不动点定理。
By means of the generalized degree method new surjectivity theorems and fixed point theorems are obtained.
运用拓扑度方法获得了一些新的满值性定理与某些新的不动点定理。
By using the fixed point theory and a new three-solution theorems, the existence of multiple solutions of the boundary value problem was obtained.
通过利用不动点指数理论及一个新的三解定理,得到了边值问题多个正解的存在性。
In this paper, we introduce the concept of the Z-M-PN space, and obtain some new fixed point theorems in probabilistic metric Spaces.
本文提出了Z - M - PN空间的概念,在概率度量空间中我们得到了若干新的不动点定理。
The study of existence of fixed point for contractive operators is extended to the set-valued case, and some fixed point theorems for set-valued contractive operators are proved.
将压缩算子不动点存在性研究推广到集值的情形,证明了几个满足压缩性质的集值算子不动点定理。
By using the fixed point theorem, we prove some new existence theorems of the solution for this class of nonlinear projection equations in Hilbert Spaces.
利用不动点定理,我们得到了关于这类非线性投影方程解的一些新的存在性定理。
Some existence and uniqueness theorems for above problem are established by using certain fixed point theorem based on the degree theory.
用基于度理论的不动点定理,建立了一系列存在唯一性定理。
Some new common fixed point theorems are established under strict contractive conditions for weakly compatible mappings satisfying the property e.
性质的弱相容映射建立几个新的的公共不动点定理。
In this paper, we obtain some common fixed point theorems under the condition of R-weakly commuting in fuzzy metric Spaces and then extend these results to fuzzy 2 and 3-metric Spaces.
讨论了模糊度量空间中在R -弱可换条件下的公共不动点存在性问题,并将此结果推广到模糊2 -度量空间及模糊3 -度量空间。
By applying the fixed point theorem, several new existence theorems of solutions for quasi-equilibrium problems are given under noncompact setting of topological Spaces.
应用此不动点定理,在非紧的一般拓扑空间中给出了几个关于拟平衡问题的解的存在性定理。
By using the collectively fixed point theorem, the existence theorems of some new system of vector equilibrium problems are obtained.
作为应用,给出了聚合不动点定理在矢量平衡问题组中的应用。
In this paper we present several common fixed point theorems for the form of rational compress pair of mapping in 2-metric space. The results improve and generalize some known results.
本文给出了2 -距离空间中有理压缩型映射对的几个公共不动点定理,改进并推广了某些已有的结果。
In this paper the properties and fixed point theorems of completely continuous maps on denumerable norm Spaces are studied.
本文讨论可数模空间上全连续算子的有限维逼近定理及该空间的一些性质。
In this paper, we obtained some fixed point theorems of the quasi-weakly continuous operators and found out these fixed points by iterative technique.
本文得到了拟弱连续算子的几个不动点定理,并用迭代法求出不动点。
In this paper, some new fixed point theorems and the iterative technique of these fixed points for increasing operators are given. The results presented here unify and extend many known results.
给出了一些新的增算子不动点存在性定理以及这些不动点的迭代解法,从而统一和推广了许多已知结果。
Using fixed point theorems, in this paper we give sufficient conditions of the existence of asymptotically-almost-periodic solution for some nonlinear delay integral equations.
利用不动点理论,给出了一类非线性延迟积分方程正的渐近概周期解存在的充分条件。
Using fixed point theorems, in this paper we give sufficient conditions of the existence of asymptotically-almost-periodic solution for some nonlinear delay integral equations.
利用不动点理论,给出了一类非线性延迟积分方程正的渐近概周期解存在的充分条件。
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