PM-空间中混合压缩的不动点定理与重合点定理

引进了Menger PM-空间中多值情形下的相容映象和弱相容映象概念，并研究了二者之间的联系．在此基础上，获得了Menger PM-空间中若干新的不动点和重合点定理．最后，给出了这一结果在度量空间中的应用．     

偏序Menger PSM-空间中的耦合重合点定理

引入Menger概率S-度量空间的概念,研究其拓扑性质,基于混合g-单调映射的概念,在偏序Menger PSM-空间中,证明了自映象对满足?-压缩条件下的耦合重合点和耦合公共不动点定理和推论,并给出例子验证新结果的有效性.     

Menger概率度量空间中Caristi型混合不动点定理

本文在Menger概率度量空间中引进Caristi型混合不动点概念,得到两个混合不动点定理和两个集值映象序列的公共混合不动点定理,我们的定理改进和推广了Caristi不动点定理及相关的近期重要结果.     

直觉Menger空间中的广义压缩映射原理及其在微分方程中的应用

利用Atanassov的思路,将直觉Menger空间定义为由Menger提出的Menger空间的自然推广.同时也得出一个新广义压缩映射,并运用该压缩映射证明了直觉Menger空间中微分方程解的存在性定理.     

MengerPN空间中非线性算子的固有值与固有元

本文首先在Menger PN空间中引进了非线性算子关于某个定点的歧点这个新概念,然后在不同的边界条件下,利用Menger PN空间中的Leray-Schauder度的性质研究了Menger PN空间中的几个非线性问题,得到了一些新结果.     

非阿基米德 Menger 概率度量空间中单值和集值映象的不动点定理

J.Achari 在[1]中证明了非阿基米德Menger空间中几个不动点定理,近年来不少人讨论过这类问题.在此基础上,本文给出非阿基米德 Menger 概率度量空间中单值和集值映象的几个不动点定理,本文的结果改进和发展了引文[1,3]中相应的结果.文中所用到的有关概率度量空间的概念和符号均见[4].定义1.设 E 是一非空集,为一切左连续的分布函数的全体.称(E,(?))为非     

关于概率度量空间中压缩型映象对的不动点定理

Menger 1942 年提出概率度量空间的概念,近年来,Sehgal,Bharucha-Reid,Istratescu,林等对概率度量空间中压缩型映象不动点定理进行了研究。本文对概率度量空间压缩型映象对给出了几个新的不动点定理,这些结果统一和发展了[2,3,4]中的某些主要结果。     

直观Menger内积空间及其在积分方程中的应用

首先引出和定义了直观的Menger内积空间的概念,然后在完备的直观的Menger内积空间中得出了一个新的不动点定理.作为应用,利用文中所得的结果,研究了线性Volterra积分方程解的存在性和唯一性.     

模糊距离空间中几类非线性压缩不动点定理

在 Kaleva-Seikkala 型模糊距离空间中建立了 Boyd-Wong 型和 Alber-Guerre Delabriere型非线性压缩不动点定理.这些结果补充了 Xiao等人的几个结果.作为应用,获得了通常距离空间和Menger概率距离空间中的几个非线性不动点定理.     

强概率收缩对与概率赋范空间中非线性算子方程组的解

在Menger PN空间引入强概率收缩对的概念,并研究了具有强概率收缩对的非线性算子方程组解的存在性和唯一性.这些结果改进和推广了非Archimedean Menger PN空间中相应的结果.     

Extension of contractive maps in the Menger probabilistic metric space

In this article, the topological properties of the Menger probabilistic metric spaces and the mappings between these spaces are studied. In addition, contractive and k-contractive mappings are introduced. As an application, a new fixed point theorem in a chainable Menger probabilistic metric space is proved.     

Common fixed points of strict contractions in Menger spaces

The aim of this paper is to prove some common fixed point theorems under certain strict contractive conditions for mappings sharing the common property (E.A) in Menger spaces. As applications to our results, we obtain the corresponding common fixed point theorems under strict contraction in metric spaces. Thus, our results generalize many known results in Menger as well as metric spaces. Some related results are also derived besides presenting several illustrative examples.     

Coincidence and common fixed point theorems for nonlinear contractions in Menger PM spaces

In this paper, we prove some existence results on coincidence and common fixed points of two pairs of self mappings without continuity under relatively weaker commutativity requirement in Menger PM spaces. Our results generalize many known results in Menger as well as metric spaces. Some related results are also derived besides furnishing illustrative examples.     

Some fixed point theorems for convex contraction mappings and mappings with convex diminishing diameters. — I

Summary In this paper we consider several classes of mappings related to the class of contraction mappings by introducing a convexity condition with respect to the iterates of the mappings. Several fixed point theorems are proved for such mappings. Further, in a similar way we consider a related class of mappings satisfying a convexity condition with respect to diameters of bounded sets. In the last part we consider classes of mappings on PM- spaces (probabilistic metric spaces of K. Menger) and some fixed point theorems are given for such classes.     

概率度量空间中广义β-可容许映射的二元重合点定理及其应用

在Menger PM-空间中,引入广义β-可容许映射的概念。在不要求两映射可交换的情况下,利用迭代法,建立了广义β-可容许映射的二元重合点定理。获得了一些新的结果,推广和改进了相关文献中的不动点定理和二元重合点定理。最后,给出了主要结果的一个应用。     

Common fixed point theorems under strict contractive conditions in Menger spaces

The main purpose of this paper is to establish some common fixed point theorems under strict contractive conditions for mappings satisfying the property (E.A) in Menger probabilistic metric spaces. As applications, we obtain the corresponding common fixed point theorems under strict contractive in metric spaces.     

概率度量空间与映象的不动点定理

概率度量空间的概念首先由Menger[7]提出,以后许多人对这一空间的理论和应用曾进行过某些讨论(见[1-9])。本文的目的是进一步研究这一空间中映象的不动点定理。在本文的§2中,我们得出了一些新型的不动点定理,这些结果改进和加强了引文[2,3,8]中某些主要结果。     

Projective versions of selection principles

All spaces are assumed to be Tychonoff. A space X is called projectively P (where P is a topological property) if every continuous second countable image of X is P. Characterizations of projectively Menger spaces X in terms of continuous mappings , of Menger base property with respect to separable pseudometrics and a selection principle restricted to countable covers by cozero sets are given. If all finite powers of X are projectively Menger, then all countable subspaces of Cp(X) have countable fan tightness. The class of projectively Menger spaces contains all Menger spaces as well as all σ-pseudocompact spaces, and all spaces of cardinality less than d. Projective versions of Hurewicz, Rothberger and other selection principles satisfy properties similar to the properties of projectively Menger spaces, as well as some specific properties. Thus, X is projectively Hurewicz iff Cp(X) has the Monotonic Sequence Selection Property in the sense of Scheepers; βX is Rothberger iff X is pseudocompact and projectively Rothberger. Embeddability of the countable fan space Vω into Cp(X) or Cp(X,2) is characterized in terms of projective properties of X.