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逻辑动态系统的应用研究进展(英文版)
作者:闫永义,岳菊梅 著
出版社:中国水利水电出版社
出版时间:2019-10-01
ISBN:9787517079873
定价:¥59.80
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内容简介
This book mainly introduces some recent advances in applications of logical dynamic systems. In particular, we concentrate on the applications in the fields of finite automata, graphs, operational research and Boolean networks. In the area of finite automata, we discuss the dynamical model, the reachability and eontroUability. In the theory of graph, we introduce an algebraic approach to study the structures of graphs, which is applied to solve the multi-track assignment problem in operational research. In the field of Boolean networks, the problems of predictor identification and simplification are fully considered.This book is suitable for professional researchers in the fields of control science and engineering, industrial automation, electrical automation and mechanical engineering, but also can be used as a reference material for relevant scientific and technical engineers.
作者简介
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目录
Preface
Chapter 1 Preliminaries
1.1 Semi-tensor Product of Matrices
1.2 Matrix Expression of Logical Functions
1.3 Summary of Finite State Machines
Chapter 2 Reachability of Finite Automata and Its Application
2.1 Introduction
2.2 Dynamic Equations of Finite Automata
2.3 Reachability Analysis of Finite Automata
2.4 Language Recognition of Finite Automata
2.5 Illustrative Examples
2.6 Conclusion
Chapter 3 Controllability and Stabilization of Finite Automata
3.1 Introduction
3.2 Controllability of Finite Automata
3.3 Stabilization of Finite Automata
3.4 Illustrative Examples
3.5 Conclusion
Chapter 4 Verification Analysis of Self-verifying Automata
4.1 Introduction
4.2 Bilinear State Transition Equations of Self-verifying Finite Automaton
4.3 Self-verifying Algorithms for Finite Automaton
4.4 Illustrative Examples
4.5 Conclusion
Chapter 5 Modelling and Control of Combined Finite Automata
5.1 Introduction
5.2 Composition of Finite Automata
5.3 Algebraic Construction of Combined Finite Automata
5.4 State and Output Control of Combined Finite Automata
5.5 Illustrative Examples
5.6 Conclusion
Chapter 6 Reachability Analysis of Discrete Event Dynamic Systems
6.1 Introduction
6.2 Mathematical Formulation of Logical Dynamics for Controlled Finite Automata
6.3 Algebraic Reachability Condition of Controlled Finite Automata
6.4 Algebraic Algorithm for Reachability of Controlled Finite Automata
6.5 Illustrative Examples
6.6 Conclusion
Chapter 7 Algebraic Method of Finding k-Degree and k-Balance Control Sets of Graphs
7.1 Introduction
7.2 Problem Statement
7.3 Algebraic Algorithm of Searching Control Sets of Graphs
7.4 Algebraic Algorithm of Searching k-Degree and k-Balance Control Sets of Graphs
7.5 Testing Examples
7.6 Conclusion
Chapter 8 Graph Approach to Solve k-Track Assignment Problem
8.1 Introduction
8.2 Searching k-internally Stable Sets of Graphs
8.3 Searching k-Absolute Maximum Internally Stable Sets of Graphs
8.4 Solvability of k-Track Assignment Problem
8.5 Illustrative Example
8.6 Conclusion
Chapter 9 Predictor Identification of Boolean Networks
9.1 Introduction
9.2 Judgment Criterion of Data-permitted Predictors
9.3 Logical Equations of Predictors
9.4 Solutions of Logical Equations
9.5 Identification of Predictors
9.6 Further Discussion on Predictors from Observed Data
9.7 Conclusion
Chapter 10 Algebraic Simplification of Boolean Networks
10.1 Introduction
10.2 Problem Description
10.3 Preserved Properties of Simplified Boolean Networks
10.4 Algebraic Algorithm of Finding Steady States and Cycles of Simplified Boolean Networks
10.5 Comparison with Other Methods
10.6 Testing Example
10.7 Conclusion
Chapter 1 Preliminaries
1.1 Semi-tensor Product of Matrices
1.2 Matrix Expression of Logical Functions
1.3 Summary of Finite State Machines
Chapter 2 Reachability of Finite Automata and Its Application
2.1 Introduction
2.2 Dynamic Equations of Finite Automata
2.3 Reachability Analysis of Finite Automata
2.4 Language Recognition of Finite Automata
2.5 Illustrative Examples
2.6 Conclusion
Chapter 3 Controllability and Stabilization of Finite Automata
3.1 Introduction
3.2 Controllability of Finite Automata
3.3 Stabilization of Finite Automata
3.4 Illustrative Examples
3.5 Conclusion
Chapter 4 Verification Analysis of Self-verifying Automata
4.1 Introduction
4.2 Bilinear State Transition Equations of Self-verifying Finite Automaton
4.3 Self-verifying Algorithms for Finite Automaton
4.4 Illustrative Examples
4.5 Conclusion
Chapter 5 Modelling and Control of Combined Finite Automata
5.1 Introduction
5.2 Composition of Finite Automata
5.3 Algebraic Construction of Combined Finite Automata
5.4 State and Output Control of Combined Finite Automata
5.5 Illustrative Examples
5.6 Conclusion
Chapter 6 Reachability Analysis of Discrete Event Dynamic Systems
6.1 Introduction
6.2 Mathematical Formulation of Logical Dynamics for Controlled Finite Automata
6.3 Algebraic Reachability Condition of Controlled Finite Automata
6.4 Algebraic Algorithm for Reachability of Controlled Finite Automata
6.5 Illustrative Examples
6.6 Conclusion
Chapter 7 Algebraic Method of Finding k-Degree and k-Balance Control Sets of Graphs
7.1 Introduction
7.2 Problem Statement
7.3 Algebraic Algorithm of Searching Control Sets of Graphs
7.4 Algebraic Algorithm of Searching k-Degree and k-Balance Control Sets of Graphs
7.5 Testing Examples
7.6 Conclusion
Chapter 8 Graph Approach to Solve k-Track Assignment Problem
8.1 Introduction
8.2 Searching k-internally Stable Sets of Graphs
8.3 Searching k-Absolute Maximum Internally Stable Sets of Graphs
8.4 Solvability of k-Track Assignment Problem
8.5 Illustrative Example
8.6 Conclusion
Chapter 9 Predictor Identification of Boolean Networks
9.1 Introduction
9.2 Judgment Criterion of Data-permitted Predictors
9.3 Logical Equations of Predictors
9.4 Solutions of Logical Equations
9.5 Identification of Predictors
9.6 Further Discussion on Predictors from Observed Data
9.7 Conclusion
Chapter 10 Algebraic Simplification of Boolean Networks
10.1 Introduction
10.2 Problem Description
10.3 Preserved Properties of Simplified Boolean Networks
10.4 Algebraic Algorithm of Finding Steady States and Cycles of Simplified Boolean Networks
10.5 Comparison with Other Methods
10.6 Testing Example
10.7 Conclusion
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