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Differential Equations with Maxima

umi D. Bainov | Snezhana G. Hristova
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A01=Snezhana G. Hristova
A01=umi D. Bainov
Asymptotic Methods
Author_Snezhana G. Hristova
Author_umi D. Bainov
averaging
boundary value analysis
Category=PBKJ
degree
Delay Differential Equations
Differential Equations
eq_isMigrated=1
eq_isMigrated=2
eq_nobargain
Function V1
functional
functional analysis
impulsive
Impulsive Differential Equations
inequalities
integral
Integral Inequalities
iterative approximation algorithms
Linear Delay Differential Equation
Lossless Transmission Lines
Lyapunov Functions
mathematical modeling applications
Maximal Solutions
Measures H0
Monotone Iterative Technique
Multipoint Boundary
Neutral Delay Differential Equations
Neutral Differential Equations
Nonlinear Differential Equations
nonlinear dynamical systems research
Nonoscillatory Solution
Order Differential Equations
ordinary
Ordinary Differential Equation
Oscillation Theory
Oscillatory Properties
partial
Partial Differential Equations
Practical Stability
qualitative solution methods
Scalar Differential Equation
stability assessment techniques
theory
topological
Uniformly Stable

Product details

  • ISBN 9780367382827
  • Weight: 453g
  • Dimensions: 156 x 234mm
  • Publication Date: 05 Sep 2019
  • Publisher: Taylor & Francis Ltd
  • Publication City/Country: GB
  • Product Form: Paperback
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Description

Differential equations with "maxima"—differential equations that contain the maximum of the unknown function over a previous interval—adequately model real-world processes whose present state significantly depends on the maximum value of the state on a past time interval. More and more, these equations model and regulate the behavior of various technical systems on which our ever-advancing, high-tech world depends. Understanding and manipulating the theoretical results and investigations of differential equations with maxima opens the door to enormous possibilities for applications to real-world processes and phenomena.

Presenting the qualitative theory and approximate methods, Differential Equations with Maxima begins with an introduction to the mathematical apparatus of integral inequalities involving maxima of unknown functions. The authors solve various types of linear and nonlinear integral inequalities, study both cases of single and double integral inequalities, and illustrate several direct applications of solved inequalities. They also present general properties of solutions as well as existence results for initial value and boundary value problems.

Later chapters offer stability results with definitions of different types of stability with sufficient conditions and include investigations based on appropriate modifications of the Razumikhin technique by applying Lyapunov functions. The text covers the main concepts of oscillation theory and methods applied to initial and boundary value problems, combining the method of lower and upper solutions with appropriate monotone methods and introducing algorithms for constructing sequences of successive approximations. The book concludes with a systematic development of the averaging method for differential equations with maxima as applied to first-order and neutral equations. It also explores different schemes for averaging, partial averaging, partially additiv
About Snezhana G. Hristova | umi D. Bainov

Drumi D. Bainov, Medical University of Sofia, Bulgaria

Snezhana G. Hristova, Plovdiv University, Bulgaria

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