多值(S)型映象度理论以及不动点定理 |
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引用本文: | 张石生 陈玉清. 多值(S)型映象度理论以及不动点定理[J]. 应用数学和力学, 1990, 11(5): 409-421 |
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作者姓名: | 张石生 陈玉清 |
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作者单位: | 四川大学数学系 |
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基金项目: | 国家自然科学基金资助课题 |
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摘 要: | 本文的主要目的是推广Browder[1,2]的结果. 本文分四部分,首先我们介绍多值(S)及其(S)+型映象以及多值(S),(S)+型极限映象.它们包含许多单调型映象为特例,如极大单调映象.有界伪单调以及有界广义伪单调映象.在第二部分我们定义(S)型映象的伪度以及(S)+映象的度,它们是Browder[1,2]中度的推广.作为应用,我们利用第二部分中的度理论来研究多值算子方程解的存在性(见第三节),获得一些新的不动点定理.
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关 键 词: | 度理论 不动点 (S)型映象 B空间 |
收稿时间: | 1989-03-25 |
Degree Theory for Multivalued(S) Type Mappings and Fixed Point Theorems |
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Affiliation: | Department of Mathematics, Sichuan University, Chengdu |
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Abstract: | The main purpose of this paper is devoted to generalizing the results of Browder[1,2]This paper consists of four parts. In the first part, we introduce the concepts of multivalued(S) and(S)+, type mappings and the concepts of the limits of multivalued(S) and(S)+ type mappings. These kinds of mappings contain many monotone type mappings, such as maximal monotone mapping, bounded pseudo-monotone mapping and bounded generalized pseudo-monotone mapping, as its special cases. In the second part we define the pseudo-degree for(S) type mapping and the degree for(S)+ type mapping. These two kinds of degrees are all the generalizations of the degree defined by Browder[1,2] As applications, we utilize the degree theory presented in part 2 to study the existence of solutions for the multivalued operator equations(see part 3) and to obtain some new fixed point theorems in part 4. |
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