Introduction to the Design and Analysis of Algorithms Anany V. Levitin

By:

Anany V. Levitin

Material type: Text

TextPublication details: Chennai Pearson 2017Edition: 3NDDescription: 589pISBN:

9789332585485

DDC classification:

005.1 LEV

Contents:

Table of Contents New to the Third Edition Preface Introduction 1.1 What Is an Algorithm? Exercises 1.1 1.2 Fundamentals of Algorithmic Problem Solving Understanding the Problem Ascertaining the Capabilities of the Computational Device Choosing between Exact and Approximate Problem Solving Algorithm Design Techniques Designing an Algorithm and Data Structures Methods of Specifying an Algorithm Proving an Algorithm’s Correctness Analyzing an Algorithm Coding an Algorithm Exercises 1.2 1.3 Important Problem Types Sorting Searching String Processing Graph Problems Combinatorial Problems Geometric Problems Numerical Problems Exercises 1.3 1.4 Fundamental Data Structures Linear Data Structures Graphs Trees Sets and Dictionaries Exercises 1.4 Summary Fundamentals of the Analysis of Algorithm Efficiency 2.1 The Analysis Framework Measuring an Input’s Size Units for Measuring Running Time Orders of Growth Worst-Case, Best-Case, and Average-Case Efficiencies Recapitulation of the Analysis Framework Exercises 2.1 2.2 Asymptotic Notations and Basic Efficiency Classes Informal Introduction O-notation -notation -notation Useful Property Involving the Asymptotic Notations Using Limits for Comparing Orders of Growth Basic Efficiency Classes Exercises 2.2 2.3 Mathematical Analysis of Nonrecursive Algorithms Exercises 2.3 2.4 Mathematical Analysis of Recursive Algorithms Exercises 2.4 2.5 Example: Computing the nth Fibonacci Number Exercises 2.5 2.6 Empirical Analysis of Algorithms Exercises 2.6 2.7 Algorithm Visualization Summary Brute Force and Exhaustive Search 3.1 Selection Sort and Bubble Sort Selection Sort Bubble Sort Exercises 3.1 3.2 Sequential Search and Brute-Force String Matching Sequential Search Brute-Force String Matching Exercises 3.2 3.3 Closest-Pair and Convex-Hull Problems by Brute Force Closest-Pair Problem Convex-Hull Problem Exercises 3.3 3.4 Exhaustive Search Traveling Salesman Problem Knapsack Problem Assignment Problem Exercises 3.4 3.5 Depth-First Search and Breadth-First Search Depth-First Search Breadth-First Search Exercises 3.5 Summary Decrease-and-Conquer 4.1 Insertion Sort Exercises 4.1 4.2 Topological Sorting Exercises 4.2 4.3 Algorithms for Generating Combinatorial Objects Generating Permutations Generating Subsets Exercises 4.3 4.4 Decrease-by-a-Constant-Factor Algorithms Binary Search Fake-Coin Problem Russian Peasant Multiplication Josephus Problem Exercises 4.4 4.5 Variable-Size-Decrease Algorithms Computing a Median and the Selection Problem Interpolation Search Searching and Insertion in a Binary Search Tree The Game of Nim Exercises 4.5 Summary Divide-and-Conquer 5.1 Mergesort Exercises 5.1 5.2 Quicksort Exercises 5.2 5.3 Binary Tree Traversals and Related Properties Exercises 5.3 5.4 Multiplication of Large Integers and Strassen’s Matrix Multiplication Multiplication of Large Integers Strassen’s Matrix Multiplication Exercises 5.4 5.5 The Closest-Pair and Convex-Hull Problems by Divide-and-Conquer The Closest-Pair Problem Convex-Hull Problem Exercises 5.5 Summary Transform-and-Conquer 6.1 Presorting Exercises 6.1 6.2 Gaussian Elimination LU Decomposition Computing a Matrix Inverse Computing a Determinant Exercises 6.2 6.3 Balanced Search Trees AVL Trees 2-3 Trees Exercises 6.3 6.4 Heaps and Heapsort Notion of the Heap Heapsort Exercises 6.4 6.5 Horner’s Rule and Binary Exponentiation Horner’s Rule Binary Exponentiation Exercises 6.5 6.6 Problem Reduction Computing the Least Common Multiple Counting Paths in a Graph Reduction of Optimization Problems Linear Programming Reduction to Graph Problems Exercises 6.6 Summary Space and Time Trade-Offs 7.1 Sorting by Counting Exercises 7.1 7.2 Input Enhancement in String Matching Horspool’s Algorithm Boyer-Moore Algorithm Exercises 7.2 7.3 Hashing Open Hashing (Separate Chaining) Closed Hashing (Open Addressing) Exercises 7.3 7.4 B-Trees Exercises 7.4 Summary Dynamic Programming 8.1 Three Basic Examples Exercises 8.1 8.2 The Knapsack Problem and Memory Functions Memory Functions Exercises 8.2 8.3 Optimal Binary Search Trees Exercises 8.3 8.4 Warshall’s and Floyd’s Algorithms Warshall’s Algorithm Floyd’s Algorithm for the All-Pairs Shortest-Paths Problem Exercises 8.4 Summary Greedy Technique 9.1 Prim’s Algorithm Exercises 9.1 9.2 Kruskal’s Algorithm Disjoint Subsets and Union-Find Algorithms Exercises 9.2 9.3 Dijkstra’s Algorithm Exercises 9.3 9.4 Huffman Trees and Codes Exercises 9.4 Summary Iterative Improvement 10.1 The Simplex Method Geometric Interpretation of Linear Programming An Outline of the Simplex Method Further Notes on the Simplex Method Exercises 10.1 10.2 The Maximum-Flow Problem Exercises 10.2 10.3 Maximum Matching in Bipartite Graphs Exercises 10.3 10.4 The Stable Marriage Problem Exercises 10.4 Summary Limitations of Algorithm Power 11.1 Lower-Bound Arguments Trivial Lower Bounds Information-Theoretic Arguments Adversary Arguments Problem Reduction Exercises 11.1 11.2 Decision Trees Decision Trees for Sorting Decision Trees for Searching a Sorted Array Exercises 11.2 11.3 P, NP, and NP-Complete Problems P and NP Problems NP-Complete Problems Exercises 11.3 11.4 Challenges of Numerical Algorithms Exercises 11.4 Summary Coping with the Limitations of Algorithm Power 12.1 Backtracking n-Queens Problem Hamiltonian Circuit Problem Subset-Sum Problem General Remarks Exercises 12.1 12.2 Branch-and-Bound Assignment Problem Knapsack Problem Traveling Salesman Problem Exercises 12.2 12.3 Approximation Algorithms for NP-Hard Problems Approximation Algorithms for the Traveling Salesman Problem Approximation Algorithms for the Knapsack Problem Exercises 12.3 12.4 Algorithms for Solving Nonlinear Equations Bisection Method Method of False Position Newton’s Method Exercises 12.4 Summary Epilogue

Summary: Based on a new classification of algorithm design techniques and a clear delineation of analysis methods, Introduction to the Design and Analysis of Algorithms, 2e presents the subject in a truly innovative manner. Written in a reader-friendly style, the book encourages broad problem-solving skills while thoroughly covering the material required for introductory algorithms. The author emphasizes conceptual understanding before the introduction of the formal treatment of each technique. Popular puzzles are used to motivate readers' interest and strengthen their skills in algorithmic problem solving.

List(s) this item appears in: New Arrivals (June 2024)

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Holdings
Item type	Current library	Collection	Call number	Status	Date due	Barcode
Books	IIITDM Kurnool COMPUTER SCIENCE ENGINEERING	Non-fiction	005.1 LEV (Browse shelf(Opens below))	Available		0005550

Table of Contents
New to the Third Edition
Preface
Introduction
1.1 What Is an Algorithm?
Exercises 1.1
1.2 Fundamentals of Algorithmic Problem Solving
Understanding the Problem
Ascertaining the Capabilities of the Computational Device
Choosing between Exact and Approximate Problem Solving
Algorithm Design Techniques
Designing an Algorithm and Data Structures
Methods of Specifying an Algorithm
Proving an Algorithm’s Correctness
Analyzing an Algorithm
Coding an Algorithm
Exercises 1.2
1.3 Important Problem Types
Sorting
Searching
String Processing
Graph Problems
Combinatorial Problems
Geometric Problems
Numerical Problems
Exercises 1.3
1.4 Fundamental Data Structures
Linear Data Structures
Graphs
Trees
Sets and Dictionaries
Exercises 1.4
Summary
Fundamentals of the Analysis of Algorithm Efficiency
2.1 The Analysis Framework
Measuring an Input’s Size
Units for Measuring Running Time
Orders of Growth
Worst-Case, Best-Case, and Average-Case Efficiencies
Recapitulation of the Analysis Framework
Exercises 2.1
2.2 Asymptotic Notations and Basic Efficiency Classes
Informal Introduction
O-notation
-notation
-notation
Useful Property Involving the Asymptotic Notations
Using Limits for Comparing Orders of Growth
Basic Efficiency Classes
Exercises 2.2
2.3 Mathematical Analysis of Nonrecursive Algorithms
Exercises 2.3
2.4 Mathematical Analysis of Recursive Algorithms
Exercises 2.4
2.5 Example: Computing the nth Fibonacci Number
Exercises 2.5
2.6 Empirical Analysis of Algorithms
Exercises 2.6
2.7 Algorithm Visualization
Summary
Brute Force and Exhaustive Search
3.1 Selection Sort and Bubble Sort
Selection Sort
Bubble Sort
Exercises 3.1
3.2 Sequential Search and Brute-Force String Matching
Sequential Search
Brute-Force String Matching
Exercises 3.2
3.3 Closest-Pair and Convex-Hull Problems by Brute Force
Closest-Pair Problem
Convex-Hull Problem
Exercises 3.3
3.4 Exhaustive Search
Traveling Salesman Problem
Knapsack Problem
Assignment Problem
Exercises 3.4
3.5 Depth-First Search and Breadth-First Search
Depth-First Search
Breadth-First Search
Exercises 3.5
Summary
Decrease-and-Conquer
4.1 Insertion Sort
Exercises 4.1
4.2 Topological Sorting
Exercises 4.2
4.3 Algorithms for Generating Combinatorial Objects
Generating Permutations
Generating Subsets
Exercises 4.3
4.4 Decrease-by-a-Constant-Factor Algorithms
Binary Search
Fake-Coin Problem
Russian Peasant Multiplication
Josephus Problem
Exercises 4.4
4.5 Variable-Size-Decrease Algorithms
Computing a Median and the Selection Problem
Interpolation Search
Searching and Insertion in a Binary Search Tree
The Game of Nim
Exercises 4.5
Summary
Divide-and-Conquer
5.1 Mergesort
Exercises 5.1
5.2 Quicksort
Exercises 5.2
5.3 Binary Tree Traversals and Related Properties
Exercises 5.3
5.4 Multiplication of Large Integers and Strassen’s Matrix Multiplication
Multiplication of Large Integers
Strassen’s Matrix Multiplication
Exercises 5.4
5.5 The Closest-Pair and Convex-Hull Problems
by Divide-and-Conquer
The Closest-Pair Problem
Convex-Hull Problem
Exercises 5.5
Summary
Transform-and-Conquer
6.1 Presorting
Exercises 6.1
6.2 Gaussian Elimination
LU Decomposition
Computing a Matrix Inverse
Computing a Determinant
Exercises 6.2
6.3 Balanced Search Trees
AVL Trees
2-3 Trees
Exercises 6.3
6.4 Heaps and Heapsort
Notion of the Heap
Heapsort
Exercises 6.4
6.5 Horner’s Rule and Binary Exponentiation
Horner’s Rule
Binary Exponentiation
Exercises 6.5
6.6 Problem Reduction
Computing the Least Common Multiple
Counting Paths in a Graph
Reduction of Optimization Problems
Linear Programming
Reduction to Graph Problems
Exercises 6.6
Summary
Space and Time Trade-Offs
7.1 Sorting by Counting
Exercises 7.1
7.2 Input Enhancement in String Matching
Horspool’s Algorithm
Boyer-Moore Algorithm
Exercises 7.2
7.3 Hashing
Open Hashing (Separate Chaining)
Closed Hashing (Open Addressing)
Exercises 7.3
7.4 B-Trees
Exercises 7.4
Summary
Dynamic Programming
8.1 Three Basic Examples
Exercises 8.1
8.2 The Knapsack Problem and Memory Functions
Memory Functions
Exercises 8.2
8.3 Optimal Binary Search Trees
Exercises 8.3
8.4 Warshall’s and Floyd’s Algorithms
Warshall’s Algorithm
Floyd’s Algorithm for the All-Pairs Shortest-Paths Problem
Exercises 8.4
Summary
Greedy Technique
9.1 Prim’s Algorithm
Exercises 9.1
9.2 Kruskal’s Algorithm
Disjoint Subsets and Union-Find Algorithms
Exercises 9.2
9.3 Dijkstra’s Algorithm
Exercises 9.3
9.4 Huffman Trees and Codes
Exercises 9.4
Summary
Iterative Improvement
10.1 The Simplex Method
Geometric Interpretation of Linear Programming
An Outline of the Simplex Method
Further Notes on the Simplex Method
Exercises 10.1
10.2 The Maximum-Flow Problem
Exercises 10.2
10.3 Maximum Matching in Bipartite Graphs
Exercises 10.3
10.4 The Stable Marriage Problem
Exercises 10.4
Summary
Limitations of Algorithm Power
11.1 Lower-Bound Arguments
Trivial Lower Bounds
Information-Theoretic Arguments
Adversary Arguments
Problem Reduction
Exercises 11.1
11.2 Decision Trees
Decision Trees for Sorting
Decision Trees for Searching a Sorted Array
Exercises 11.2
11.3 P, NP, and NP-Complete Problems
P and NP Problems
NP-Complete Problems
Exercises 11.3
11.4 Challenges of Numerical Algorithms
Exercises 11.4
Summary
Coping with the Limitations of Algorithm Power
12.1 Backtracking
n-Queens Problem
Hamiltonian Circuit Problem
Subset-Sum Problem
General Remarks
Exercises 12.1
12.2 Branch-and-Bound
Assignment Problem
Knapsack Problem
Traveling Salesman Problem
Exercises 12.2
12.3 Approximation Algorithms for NP-Hard Problems
Approximation Algorithms for the Traveling Salesman Problem
Approximation Algorithms for the Knapsack Problem
Exercises 12.3
12.4 Algorithms for Solving Nonlinear Equations
Bisection Method
Method of False Position
Newton’s Method
Exercises 12.4
Summary
Epilogue

Based on a new classification of algorithm design techniques and a clear delineation of analysis methods, Introduction to the Design and Analysis of Algorithms, 2e presents the subject in a truly innovative manner. Written in a reader-friendly style, the book encourages broad problem-solving skills while thoroughly covering the material required for introductory algorithms. The author emphasizes conceptual understanding before the introduction of the formal treatment of each technique. Popular puzzles are used to motivate readers' interest and strengthen their skills in algorithmic problem solving.

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