微分方程與包含的拓撲方法（英文）

本書就是一部原版引進的專門講拓撲方法的數學專著，中文書名或可譯為《微分方程與包含的拓撲方法》。本書一共有三位作者，第一位是約翰.R.格雷夫（John R.Graef），美國人，田納西大學查塔努加分校的數學教授，此前曾在密西西比州立大學任教。第二位是約翰尼.亨德森（Johnny Henderson），美國人貝勒大學傑出的數學教授，曾在奧本大學和密蘇里科技大學擔任教職，是美國數學學會的初始成員。第三位是阿卜杜勒加尼.奧哈比（Abdelghani Oushsb），阿爾及利亞人，阿爾及利亞吉拉利.利亞貝斯大學西迪貝爾數學實驗室的數學教授。

Introduction

1 Background in Multi-valued Analysis

 1.1 Some notions and definitions

 1.2 Examples of multivalued mappings

 1.3 Vietoris topology

 1.4 Continuity concepts

 1.5 Upper semicontinuity and closed graphs

 1.6 Upper and lower semicontinuous (u.s.c. and l.s.c.) functions and their relations

 1.7 Lower semicontinuity and open graphs

 1.8 Linear operations on nmltifunctions

 1.9 Closed and proper multivalued maps

 1.10 Open multivalued maps

 1.11 Weakly upper and lower semicontinuous functions

 1.12 The topology a(X, X*)

2 Hausdorff-Pompeiu Metric Topology

 2.1 Hausdorff continuity

 2.2 Hd-U.S.C, l.s.c., and single-valued u.s.c. and l.s.c.functions

 2.3 Fixed point theorems for multi-valued contractive mappings

3 Measurable Multifunctions

 3.1 Measurable selection

 3.2 Scalar measurable

 3.2.1 Scalarly measurable selection

 3.3 Lusin's theorem type

 3.4 Hausdorff-measurable multivalued maps

 3.5 The Scorza-Dragoni property

 3.6 Lp selection

4 Continuous Selection Theorems

 4.1 Partitions of unity

 4.2 Michael's selection ttmorem

5 Linear Multivalued Operators

 5.1 Uniform boundedness principle

 5.2 Norm of linear multivalued operators

6 Fixed Point Theorems

 6.1 Approximation methods and fixed point theorems

 6.2 Schauder-Tychonoff fixed point theorem

 6.3 Fan's fixed point theorem

 6.4 Krasnosel'skii-type fixed point theorems

 6.4.1 Krasnosel'skii-type fixed point theorem for weakly-weakly u

 6.4.2 Krasnosel'skii-type fixed point theorem for u

 6.4.3 Expansive Krasnosel'skii type fixed point theorem

 6.4.4 Expansive Krasnosel'skii-type fixed point theorem for weakly continuous maps

 6.4.5 Expansive Krasnosel'skii-type fixed point theorem for weakly-weakly U

 6.4.6 Krasnosel'skii type in a Fr6chet space

 6.4.7 Measure of noncompactness and Krasnosel'skii's theorem

 6.5 Fixed point theorems for sums of two multivalued operators

 6.6 Kakutani fixed point theorem type in topological vector spaces

 6.7 Krasnosel'skii-type fixed point theorem in topological vector spaces

7 Generalized Metric and Banach Spaces

 7.1 Generalized metric space

 7.2 Generalized Banach space

 7.3 Matrix convergence

8 Fixed Point Theorems in Vector Metric and Banach Spaces

 8.1 Banach principle theorem

 8.2 Continuation methods for contractive maps

 8.3 Perov fixed point type for expansive mapping

 8.4 Leray-Schauder type theorem

 8.5 Measure of noncompactness

 8.6 Approximation method and Perov type fixed point theorem

 8.7 Covitz and Nadler type fixed point theorems

 8.8 Fixed point index

 8.9 Legggett-Williams type fixed point results

 8.10 Legggett-Williams type fixed point theorems in vector Banach spaces

 8.11 Multiple fixed points

9 Random Fixed Point Theorems

 9.1 Principle expansive mapping

 9.2 Approximation method and Krasnosel'skii-type fixed point theorems

 9.3 Random fixed point for a Cartesian product of operators

 9.4 Measurable selection in vector metric space

 9.5 Perov random fixed point theorem

 9.6 Schauder and Krasnosel'skii type random fixed point

10 Semigroups

 10.1 C0-semigroups

 10.1.1 Analytic semigroups

 10.2 Fractional powers of closed operators

11 Systems of Impulsive Differential Equations on Half-lines

 11.1 Uniqueness and continuous dependence on initial data

 11.2 Existence and compactness of solution sets

12 Differential Inclusions

 12.1 Filippov's theorem on a bounded intervals

 12.2 Impulsive semilinear differential inclusions

 12.2.1 Existence results

 12.3 Impulsive Stokes differential inclusions

 12.4 Differential inclusions in Almgren sense

 12.4.1 Multiple-valued function in Almgren sense

 12.4.2 Existence result on unbounded domains

 12.5 Inclusions in Almgren sense with Riemann-Liouville derivatives

 12.5.1 Fractional calculus

 12.5.2 Existence result

 12.6 Differential inclusions via Caputo fractional derivative

 12.6.1 Existence and compactness result

13 Random Systems of Differential Equations

 13.1 Random Cauchy problem

 13.2 Boundary value problems

 13.3 An example

14 Random Fractional Differential Equations

 14.1 Hadamard fractional derivative

 14.2 Random fractional derivative

 14.3 Existence of solution

 14.4 M2-solutions

 14.4.1 Existence and uniqueness of M2-solutions

15 Existence Theory for Systems of Discrete Equations

 15.1 Introduction and motivations

 15.1.1 Cagan's model with backward-looking market participants

 15.1.2 Electronic model

 15.2 Gronwall inequalities

 15.3 Cauchy discrete problem

 15.4 Existence and uniqueness

 15.5 Existence and compactness of solution sets

 15.6 Systems of difference equations with infinite delay

 15.6.1 Definitions and fundamental results

 15.6.2 Boundedness of solutions

 15.6.3 Weighted boundedness and asymptotic behavior

 15.6.4 Asymptotic periodicity

 15.6.5 Volterra difference system with infinite delay

 15.7 Boundary value problems

 15.8 Second order boundary value problems

 15.9 Multiplicity of solutions for nth order boundary value problems

16 Discrete Inclusions

 16.1 Cauchy problem for discrete inclusions

 16.2 Existence and compactness result

17 Semilinear System of Discrete Equations

 17.1 Existence and uniqueness results

 17.2 Boundary value problems

18 Discrete Boundary Value Problems

 18.1 Initial value problems

 18.2 Nonlocal boundary value problems

 18.3 Differentiation of solutions with respect to boundary conditions

Bibliography

Index

編輯手記