15-344/Classnotes for Tuesday September 15: Difference between revisions
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all edges in a graph are matched. |
all edges in a graph are matched. |
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== Scanned Lecture |
== Scanned Lecture Notes for September 15 == |
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Image:15-344_Note_1.jpg|Summary |
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== Handwritten Lecture Notes in PDF == |
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[[Media:15-344(lecture1).PDF|MAT344 - Lecture1 (Sep 15)]] |
Latest revision as of 10:33, 7 November 2015
We mostly went over Day One Handout today.
Dror's notes above / Students' notes below |
Lecture Note for September 15
DEFINITION 1 Graph A graph is a set (usually finite, "vertices") along with a set ("edges") of unordered pairs of distinct elements of .
DEFINITION 2 Incident If an edge , we say that is incident to
and .
DEFINITION 3 N-valent In a graph , a vertex is called
bivalent if it is incident to precisely two edges and n-valent if incident to precisely n edges, where .
DEFINITION 4 Edge Cover An edge cover for graph is a subset such that every edge of incident to at least one vertex in .
DEFINITION 5 Independent Let be a graph. A subset is called independent if whenever , then .
THEOREM 1 Edge covers are complementary to independent sets. In other words, is an edge cover if and only if
the complementary subset is an independent set.
Proof
Assume is an edge cover. I assert that is independent.
Indeed, if , then since is an edge cover, either Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "https://wikimedia.org/api/rest_v1/":): {\displaystyle a\in{C} \implies a\notin{I}}
or
, which implies does not connect any two elements of .
Assume is independent. Pick any edge . As is independent, Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "https://wikimedia.org/api/rest_v1/":): {\displaystyle (ab)} does not connect any two members of . Hence, either or , which implies is incident to an element of . QED
DEFINITION 6 Matching is a subset of edges of a graph where no two edges share a common vertex. A matching is said to be perfect if all edges in a graph are matched.
Scanned Lecture Notes for September 15