Let D be a digraph. 1. Suppose that 8+ (D) ≤ 1 and let C be a cycle in D. Show that C is a directed cycle. 2. Let D be a digraph such that 8+ (D) ≥ 1. Let P be a directed path in D from a vertex x to a vertex y such that P is of maximum length. (a) Show that any out neighbor of y is on P. (b) Show that D contains a directed cycle. 3. Suppose that D is a strong digraph. Prove that 8+ (D) ≥ 1 and 8 (D) ≥ 1.

Let D be a digraph. 1. Suppose that 8+ (D) ≤ 1 and let C be a cycle in D. Show that C is a directed cycle. 2. Let D be a digraph such that 8+ (D) ≥ 1. Let P be a directed path in D from a vertex x to a vertex y such that P is of maximum length. (a) Show that any out neighbor of y is on P. (b) Show that D contains a directed cycle. 3. Suppose that D is a strong digraph. Prove that 8+ (D) ≥ 1 and 8 (D) ≥ 1.

Linear Algebra: A Modern Introduction

4th Edition

ISBN:9781285463247

Author:David Poole

Publisher:David Poole

Chapter3: Matrices

Section3.7: Applications

Problem 74EQ

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graph theory part 1 ,2 and 3

Exercise 4.
Let D be a digraph.
1. Suppose that 8+ (D) ≤ 1 and let C be a cycle in D. Show that C is a directed cycle.
2.
Let D be a digraph such that 8* (D) ≥ 1. Let P be a directed path in D from a vertex x to a vertex
y such that P is of maximum length.
(a) Show that any out neighbor of y is on P.
(b) Show that D contains a directed cycle.
3. Suppose that D is a strong digraph. Prove that 8+ (D) ≥ 1 and 8¯(D) ≥ 1.

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Step 1: Conceptual Introduction

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Step 2: Directed Cycle in a Digraph with δ+(D)≤1

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Step 3: Properties of a Directed Path of Maximum Length

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Step 4: Strong Digraphs and Their Degrees

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