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Impulsive differential inclusions : a fixed point approach / John R. Graef, Johnny Henderson, Abdelghani Ouahab.
Math/Physics/Astronomy Library QA274.23 .G73 2013
Available
- Format:
- Book
- Author/Creator:
- Graef, John R., 1942-
- Series:
- De Gruyter series in nonlinear analysis and applications ; 20.
- De Gruyter series in nonlinear analysis and applications ; 20
- Language:
- English
- Subjects (All):
- Stochastic processes.
- Boundary value problems.
- Differential equations.
- Prediction theory.
- Physical Description:
- x, 400 pages ; 25 cm.
- Place of Publication:
- Berlin ; Boston : Walter de Gruyter GmbH & Co., KG, [2013]
- Summary:
- Differential equations with impulses arise as models of many evolving processes that are subject to abrupt changes, such as shocks, harvesting, and natural disasters. These phenomena involve short-term p from continuous and smooth dynamics, whose duration is negligible in comparison with the duration of an entire evolution. In models involving such perturbations, it is natural to assume these perturbations act instantaneously or in the form of impulses. As a consequence, impulsive differential equations have been developed in modeling impulsive problems in physics, population dynamics, ecology, biotechnology, industrial robotics, pharmacokinetics, optimal control, and so forth. There are also many different studies in-biology and medicine for which impulsive differential equations provide good models. During the last 10 years, the authors have been responsible for extensive contributions to the literature on impulsive differential inclusions via fixed point methods. This book is motivated by that research as the authors endeavor to bring under one cover much of those results along with results by other researchers either affecting or affected by the authors' work. The questions of existence and stability of solutions for different classes of initial value problems for impulsive differential equations and inclusion with fixed and variable moments are considered in detail. Attention is also given to boundary value problems. In addition, since differential equations can be viewed as special cases of differential inclusions, significant attention is also give to relative questions concerning differential equations. This monograph addresses a variety of side issues that arise from its simpler beginnings as well. Book jacket.
- Contents:
- 1 Introduction and Motivations 1
- 1.1 Introduction 1
- 1.2 Motivational Models 8
- 1.2.1 Kruger-Thiemer Model 8
- 1.2.2 Lotka-Volterra Model 8
- 1.2.3 Pulse Vaccination Model 9
- 1.2.4 Management Model 9
- 1.2.5 Some Examples in Economics and Biomathematics 10
- 2 Preliminaries 11
- 2.1 Some Definitions 11
- 2.2 Some Properties in Fréchet Spaces 12
- 2.3 Some Properties of Set-valued Maps 13
- 2.3.1 Hausdorff Metric Topology 15
- 2.3.2 Vietoris Topology 18
- 2.3.3 Continuity Concepts and Their Relations 20
- 2.3.4 Selection Functions and Selection Theorems 28
- 2.3.5 Hausdorff Continuity 30
- 2.3.6 Measurable Multifunctions 32
- 2.3.7 Decomposable Selection 35
- 2.4 Fixed Point Theorems 36
- 2.5 Measures of Noncompactness: MNC 37
- 2.6 Semigroups 40
- 2.6.1 C₀-semigroups 40
- 2.6.2 Integrated Semigroups 42
- 2.6.3 Examples 44
- 2.7 Extrapolation Spaces 45
- 3 FDEs with Infinite Delay 47
- 3.1 First Order FDEs 47
- 3.1.1 Examples of Phase Spaces 48
- 3.1.2 Existence and Uniqueness on Compact Intervals 50
- 3.1.3 An Example 57
- 3.2 FDEs with Multiple Delays 58
- 3.2.1 Existence and Uniqueness Result on a Compact Interval 58
- 3.2.2 Global Existence and Uniqueness Result 65
- 3.3 Stability 66
- 3.3.1 Stability Result 67
- 3.4 Second Order Impulsive FDEs 69
- 3.4.1 Existence and Uniqueness Results 71
- 3.5 Global Existence and Uniqueness Result 76
- 3.5.1 Uniqueness Result 77
- 3.5.2 Example 82
- 3.5.3 Stability 83
- 4 Boundary Value Problems on Infinite Intervals 86
- 4.1 Introduction 86
- 4.1.1 Existence Result 87
- 4.1.2 Uniqueness Result 92
- 4.1.3 Example 96
- 5 Differential Inclusions 98
- 5.1 Introduction 98
- 5.1.1 Filippov's Theorem 98
- 5.1.2 Relaxation Theorem 111
- 5.2 Functional Differential Inclusions 113
- 5.2.1 Filippov's Theorem for FDIs 114
- 5.2.2 Some Properties of Solution Sets 123
- 5.3 Upper Semicontinuity without Convexity 125
- 5.3.1 Nonconvex Theorem and Upper Semicontinuity 126
- 5.3.2 An Application 130
- 5.4 Inclusions with Dissipative Right Hand Side 131
- 5.4.1 Existence and Uniqueness Result 131
- 5.5 Directionally Continuous Selection and IDIs 136
- 5.5.1 Directional Continuity 136
- 6 Differential Inclusions with Infinite Delay 140
- 6.1 Existence Results 140
- 6.2 Boundary Differential Inclusions 150
- 7 Impulsive FDEs with Variable Times 154
- 7.1 Introduction 154
- 7.1.1 Existence Results 154
- 7.1.2 Neutral Functional Differential Equations 155
- 7.2 Impulsive Hyperbolic Differential Inclusions with Infinite Delay 156
- 7.3 Existence Results 157
- 7.3.1 Phase Spaces 157
- 7.3.2 The Nonconvex Case 168
- 8 Neutral Differential Inclusions 171
- 8.1 Filippov's Theorem 171
- 8.2 The Relaxed Problem 182
- 8.2.1 Existence and Compactness Result: an MNC Approach 189
- 9 Topology and Geometry of Solution Sets 199
- 9.1 Background in Geometric Topology 199
- 9.2 Aronszajn Type Results 201
- 9.2.1 Solution Sets for Impulsive Differential Equations 206
- 9.3 Solution Sets of Differential Inclusions 208
- 9.4 σ-selectionable Multivalued Maps 208
- 9.4.1 Contractible and Rδ-contractible 212
- 9.4.2 Rδ-sets 218
- 9.5 Impulsive DIs on Proximate Retracts 219
- 9.5.1 Viable Solution 220
- 9.6 Periodic Problems 226
- 9.6.1 Poincaré Translation Operator 226
- 9.6.2 Existence Result 227
- 9.7 Solution Set for Nonconvex Case 231
- 9.7.1 Continuous Selection and AR of Solution Sets 232
- 9.8 The Terminal Problem 245
- 9.8.1 Existence and Solution Set 245
- 10 Impulsive Semilinear Differential Inclusions 254
- 10.1 Nondensely Defined Operators 254
- 10.2 Integral Solutions 255
- 10.3 Exact Controllability 267
- 10.3.1 Controllability of Impulsive FDIs 267
- 10.3.2 Controllability of Impulsive Neutral FDIs 276
- 10.4 Controllability in Extrapolation Spaces 282
- 10.5 Second Order Impulsive Semilinear FDIs 290
- 10.5.1 Mild Solutions 291
- 10.5.2 Filippov's Theorem 292
- 10.5.3 Filippov-Wazewski's Theorem 303
- 11 Selected Topics 306
- 11.1 Stochastic Differential Equations 306
- 11.1.1 Itô Integral 307
- 11.1.2 Definition of a Mild Solution 308
- 11.1.3 Existence and Uniqueness 311
- 11.1.4 Global Existence and Uniqueness 321
- 11.2 Impulsive Sweeping Processes 327
- 11.2.1 Preliminaries in Nonsmooth Analysis 327
- 11.2.2 Uniqueness Result 328
- 11.3 Integral Inclusions of Volterra Type in Banach Spaces 331
- 11.3.1 Resolvent Family 332
- 11.3.2 Existence results 334
- 11.3.3 The Convex Case: an MNC Approach 339
- 11.3.4 The Nonconvex Case 342
- 11.4 Filippov's Theorem 346
- 11.4.1 Filippov's Theorem on a Bounded Interval 346
- 11.5 The Relaxed Problem 351.
- Notes:
- Includes bibliographical references (pages [369]-397) and index.
- Local Notes:
- Acquired for the Penn Libraries with assistance from the Anne and Joseph Trachtman Memorial Book Fund.
- ISBN:
- 3110293617
- 9783110293616
- OCLC:
- 843124248
- Publisher Number:
- 99957558729
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