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DISCRETE MATHEMATICS AND LTS APPLICATIONS (FIFTH EDITION)
DISCRETE MATHEMATICS AND LTS APPLICATIONS (FIFTH EDITION)

DISCRETE MATHEMATICS AND LTS APPLICATIONS (FIFTH EDITION)PDF电子书下载

外文

  • 电子书积分:24 积分如何计算积分?
  • 作 者:(美)Kenneth H.Rosen著
  • 出 版 社:机械工业出版社
  • 出版年份:2003
  • ISBN:7111115031
  • 页数:912 页
图书介绍:本书介绍了离散数学的理论、方法及其实际应用。
《DISCRETE MATHEMATICS AND LTS APPLICATIONS (FIFTH EDITION)》目录
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1 The Foundations:Logic and Proof,Sets,and Functions 1

1.1 Logic 1

1.2 Propositional Equivalences 20

1.3 Predicates and Quantifiers 28

1.4 Nested Quantifiers 44

1.5 Methods of Proof 56

1.6 Sets 77

1.7 Set Operations 86

1.8 Functions 97

End-of-Chapter Material 111

2 The Fundamentals:Algorithms,the Integers,and Matrices 119

2.1 Algorithms 120

2.2 The Growth of Functions 131

2.3 Complexity of Algorithms 144

2.4 The Integers and Division 153

2.5 Integers and Algorithms 169

2.6 Applications of Number Theory 181

2.7 Matrices 196

End-of-Chapter Material 206

3 Mathematical Reasoning,Induction,and Recursion 213

3.1 Proof Strategy 214

3.2 Sequences and Summations 225

3.3 Mathematical Induction 238

3.4 Recursive Definitions and Structural Induction 256

3.5 Recursive Algorithms 274

3.6 Program Correctness 284

End-of-Chapter Material 290

4 Counting 301

4.1 The Basics of Counting 301

4.2 The Pigeonhole Principle 313

4.3 Permutations and Combinations 320

4.4 Binomial Coefficients 327

4.5 Generalized Permutations and Combinations 335

4.6 Generating Permutations and Combinations 344

End-of-Chapter Material 349

5 Discrete Probability 355

5.1 An Introduction to Discrete Probability 355

5.2 Probability Theory 362

5.3 Expected Value and Variance 379

End-of-Chapter Material 394

6 Advanced Counting Techniques 401

6.1 Recurrence Relations 401

6.2 Solving Recurrence Relations 413

6.3 Divide-and-Conquer Algorithms and Recurrence Relations 425

6.4 Generating Functions 435

6.5 Inclusion-Exclusion 451

6.6 Applications of Inclusion-Exclusion 457

End-of-Chapter Material 465

7 Relations 471

7.1 Relations and Their Properties 471

7.2 n-ary Relations and Their Applications 482

7.3 Representing Relations 489

7.4 Closures of Relations 496

7.5 Equivalence Relations 507

7.6 Partial Orderings 516

End-of-Chapter Material 530

8 Graphs 537

8.1 Introduction to Graphs 537

8.2 Graph Terminology 545

8.3 Representing Graphs and Graph Isomorphism 557

8.4 Connectivity 567

8.5 Euler and Hamilton Paths 577

8.6 Shortest-Path Problems 593

8.7 Planar Graphs 603

8.8 Graph Coloring 613

End-of-Chapter Material 622

9 Trees 631

9.1 Introduction to Trees 631

9.2 Applications of Trees 644

9.3 Tree Traversal 660

9.4 Spanning Trees 674

9.5 Minimum Spanning Trees 688

End-of-Chapter Material 694

10 Boolean Algebra 701

10.1 Boolean Functions 701

10.2 Representing Boolean Functions 709

10.3 Logic Gates 712

10.4 Minimization of Circuits 719

End-of-Chapter Material 734

11 Modeling Computation 739

11.1 Languages and Grammars 739

11.2 Finite-State Machines with Output 751

11.3 Finite-State Machines with No Output 758

11.4 Language Recognition 765

11.5 Turing Machines 775

End-of-Chapter Material 783

Appendixes 788

A.1 Exponential and Logarithmic Functions 788

A.2 Pseudocode 791

Suggested Readings 797

Answers to Odd-Numbered Exercises 805

Photo Credits 888

Index of Biographies 889

Index 890

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