Recent advances in the Lefschetz fixed point theory for multivalued mappings

Q1 Mathematics
L. Górniewicz
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引用次数: 0

Abstract

In 1923 S. Lefschetz proved the famous xed point theorem known as the Lefschetz xed point theorem (comp. [5], [9], [20], [21]. The multivalued case was considered for the rst time in 1946 by S. Eilenberg and D. Montgomery ([10]). They proved the Lefschetz xed point theorem for acyclic mappings of compact ANR-spaces (absolute neighbourhood retracts (see [4] or [13]) using Vietoris mapping theorem (see [4], [13], [16]) as a main tool. In 1970 Eilenberg, Montgomery's result was generalized for acyclic mappings of complete ANR-s (see [17]). Next, a class of admissible multivalued mappings was introduced ([13] or [16]). Note that the class of admissible mappings is quite large and contains as a special case not only acyclic mappings but also nite compositions of acyclic mappings. For this class of multivalued mappings several versions of the Lefschetz xed point theorem was proved (comp. [11], [13] [15], [18], [19], [27]). In 1982 G. Skordev and W. Siegberg ([26]) introduced the class of multivalued mappings so-called now (1 − n)-acyclic mappings. Note that the class (1 − n)-acyclic mappings contains as a special case n-valued mappings considered in [6], [12], [28]. We recommend [8] for the most important results connected with (1 − n)-acyclic mappings. Finally, the Lefschetz xed point theorem was considered for spheric mappings (comp. [3], [2], [7], [23]) and for random multivalued mappings (comp. [1], [2], [13]). Let us remark that the main classes of spaces for which the Lefschetz xed point theorem was formulated are the class of ANR-spaces ([4]) and MANR-spaces (multi absolute neighbourhood retracts (see [27]). The aim of this paper is to recall the most important results concerning the Lefschetz xed point theorem for multivalued mappings and to prove new versions of this theorem, mainly for AANR-spaces (approximative absolute neighborhood retracts (see [4] or [13]) and for MANR-s. We believe that this article will be useful for analysts applying topological xed point theory for multivalued mappings in nonlinear analysis, especially in di erential inclusions. Email address: gorn@mat.umk.pl (Lech Górniewicz) Received March 17, 2021, 2021, Accepted May 14, 2021, Online May 22, 2021. L. Górniewicz, Results in Nonlinear Anal. 4 (2021), 116 126 117
多值映射的Lefschetz不动点理论的最新进展
1923年,S.Lefschetz证明了著名的不动点定理,即Lefschetz-不动点定理(comp.[5],[9],[20],[21])。1946年,S.Eilenberg和D.Montgomery([10])首次考虑了多值情况。他们使用Vietoris映射定理(见[4],[13],[16])作为主要工具,证明了紧致ANR空间(绝对邻域收缩(见[4]或[13]))的非循环映射的Lefschetz不动点定理。1970年,Eilenberg将Montgomery的结果推广到完全ANR-s的非循环映射(见[17])。接下来,引入了一类可容许多值映射([13]或[16])。注意,可容许映射类是相当大的,并且作为特例不仅包含非环映射,还包含非环映象的nite组成。对于这类多值映射,证明了Lefschetz不动点定理的几个版本(comp.[11],[13][15],[18],[19],[27])。1982年,G.Skordev和W.Siegberg([26])引入了一类多值映射,即现在(1−n)-非循环映射。注意,类(1−n)-非循环映射包含[6]、[12]、[28]中考虑的n值映射作为特例。对于与(1−n)-非循环映射相关的最重要的结果,我们建议[8]。最后,考虑了球映射(comp.[3],[2],[7],[23])和随机多值映射(comp.[1],[2],[13])的Lefschetz不动点定理。让我们注意到,Lefschetz不动点定理被公式化的主要空间类是ANR空间([4])和MANR空间(多绝对邻域收缩(见[27]))。本文的目的是回顾关于多值映射的Lefschetz不动点定理的最重要的结果,并证明该定理的新版本,主要针对AANR空间(近似绝对邻域收缩(参见[4]或[13])和MANR-s。我们相信,这篇文章将对在非线性分析中,特别是在微分包含中,应用拓扑不动点理论研究多值映射的分析师有用。电子邮件地址:gorn@mat.umk.pl(Lech Górniewicz)2021年3月17日收到,2021年5月14日接受,2021年6月22日在线。L.Górniewicz,非线性分析的结果。4(2021),116 126 117
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来源期刊
Results in Nonlinear Analysis
Results in Nonlinear Analysis Mathematics-Mathematics (miscellaneous)
CiteScore
1.60
自引率
0.00%
发文量
34
审稿时长
8 weeks
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