194 lines
7.2 KiB
Markdown
194 lines
7.2 KiB
Markdown
---
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title: Graphs
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TARGET DECK: Obsidian::STEM
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FILE TAGS: data_structure::graph
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tags:
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- data_structure
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- graph
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---
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## Overview
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There are two standard ways of representing graphs in memory: **adjacency-list** representations and **adjacency-matrix** representations.
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%%ANKI
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Basic
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Using asymptotic notation, how do the number of edges in a graph relate to the number of vertices?
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Back: $\lvert E \rvert = O(\lvert V^2 \rvert)$
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579417-->
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END%%
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%%ANKI
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Basic
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For graph $G = \langle V, E \rangle$, *why* is $\lvert E \rvert = O(\lvert V^2 \rvert)$?
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Back: Because $E$ is a binary relation on $V$.
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579420-->
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END%%
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%%ANKI
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Basic
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What are the two standard ways of representing graphs in memory?
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Back: The adjacency-list and adjacency-matrix representations.
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579422-->
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END%%
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%%ANKI
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Basic
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Which standard graph representation is preferred for sparse graphs?
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Back: Adjacency-list representations.
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579423-->
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END%%
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%%ANKI
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Basic
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Which standard graph representation is preferred for dense graphs?
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Back: Adjacency-matrix representations.
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579424-->
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END%%
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%%ANKI
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Basic
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When is a graph $G = \langle V, E \rangle$ considered dense?
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Back: When $\lvert E \rvert \approx \lvert V \rvert^2$.
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579425-->
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END%%
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## Adjacency-List
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Let $G = \langle V, E \rangle$ be a graph. An adjacency-list representation of $G$ has an array of size $\lvert V \rvert$. Given $v \in V$, the index corresponding to $v$ contains a linked list containing all adjacent vertices.
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%%ANKI
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Basic
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Let $G = \langle V, E \rangle$ be a graph. It's adjacency-list representation is an array of what size?
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Back: $\lvert V \rvert$
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579426-->
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END%%
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%%ANKI
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Basic
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The following is an example of what kind of graph representation?
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![[adj-list-representation.png]]
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Back: An adjacency-list representation.
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579427-->
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END%%
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%%ANKI
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Basic
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Are adjacency-list representations used for directed or undirected graphs?
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Back: Both.
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579428-->
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END%%
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%%ANKI
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Basic
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Let $G = \langle V, E \rangle$ be a graph. What is the sum of its adjacency-list representation's list lengths?
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Back: N/A. This depends on whether $G$ is a directed or undirected graph.
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579429-->
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END%%
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%%ANKI
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Basic
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Let $G = \langle V, E \rangle$ be a digraph. What is the sum of its adjacency-list representation's list lengths?
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Back: $\lvert E \rvert$
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579431-->
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END%%
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%%ANKI
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Basic
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Let $G = \langle V, E \rangle$ be an undirected graph. What is the sum of its adjacency-list representation's list lengths?
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Back: $2\lvert E \rvert$
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579432-->
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END%%
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%%ANKI
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Basic
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Which lemma explains the sum of an undirected graph adjacency-list representation's list lengths?
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Back: The handshake lemma.
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579433-->
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END%%
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%%ANKI
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Basic
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Let $G = \langle V, E \rangle$. What is the memory usage of its adjacency-list representation?
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Back: $\Theta(\lvert V \rvert + \lvert E \rvert)$
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579434-->
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END%%
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## Adjacency-Matrix
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Let $G = \langle V, E \rangle$ be a graph. An adjacency-matrix representation of $G$ is a $\lvert V \rvert \times \lvert V \rvert$ matrix $A = (a_{ij})$ such that $$a_{ij} = \begin{cases} 1 & \text{if } \langle i, j \rangle \in E \\ 0 & \text{otherwise} \end{cases}$$
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%%ANKI
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Basic
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Let $G = \langle V, E \rangle$ be a graph. It's adjacency-matrix representation is a matrix of what dimensions?
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Back: $\lvert V \rvert \times \lvert V \rvert$
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579435-->
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END%%
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%%ANKI
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Basic
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What values are found in an adjacency-matrix representation of a graph?
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Back: $0$ and/or $1$.
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579436-->
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END%%
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%%ANKI
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Basic
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The following is an example of what kind of graph representatio?
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![[adj-matrix-representation.png]]
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Back: An adjacency-matrix representation.
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579437-->
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END%%
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%%ANKI
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Basic
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Are adjacency-matrix representations used for directed or undirected graphs?
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Back: Both.
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579438-->
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END%%
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%%ANKI
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Basic
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For what graphs are adjacency-matrix representations symmetric along its diagonal?
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Back: Undirected graphs.
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579439-->
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END%%
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%%ANKI
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Basic
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*Why* is the adjacency-matrix representation of undirected graph $G = \langle V, E \rangle$ symmetric along its diagonal?
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Back: If $\langle i, j \rangle \in E$ then $\langle j, i \rangle \in E$.
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579440-->
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END%%
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%%ANKI
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Basic
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Let $G = \langle V, E \rangle$. What is the memory usage of its adjacency-matrix representation?
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Back: $\Theta(\lvert V \rvert^2)$
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Reference: Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022).
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<!--ID: 1724614579441-->
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END%%
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## Bibliography
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* Thomas H. Cormen et al., _Introduction to Algorithms_, Fourth edition (Cambridge, Massachusett: The MIT Press, 2022). |