(Created page with "== Graphs == A graph is simply a structure consisting of “edges” and “vertices.” An edge will connect two vertices together, and if appropriate, the edge may be defin...") |
|||
(One intermediate revision by the same user not shown) | |||
Line 4: | Line 4: | ||
This paper will be mostly concerned with “quivers,” which are a particular type of “directed multigraph” (a graph consisting of directed edges, which also allow for multiple edges). A quiver is special in that it strictly prohibits any instances of 1-cycles and 2-cycles. | This paper will be mostly concerned with “quivers,” which are a particular type of “directed multigraph” (a graph consisting of directed edges, which also allow for multiple edges). A quiver is special in that it strictly prohibits any instances of 1-cycles and 2-cycles. | ||
+ | |||
+ | [[ Walther MA271 Fall2020 topic4|Back to Walther MA271 Fall2020 topic4]] | ||
+ | [[Category:MA271Fall2020Walther]] |
Latest revision as of 18:49, 6 December 2020
Graphs
A graph is simply a structure consisting of “edges” and “vertices.” An edge will connect two vertices together, and if appropriate, the edge may be defined as directed to indicate a proper direction. It is possible to have multiple edges between the same two vertices, which we call an instance of “multiple edges” --- the graph would be classified as a “multigraph.” Cycles in graphs are paths that can be taken along edges that start and end at the same vertex. A “1-cycle,” also called a “loop,” is an edge that connects a vertex to itself. A “2-cycle” is a cycle that consists of two edges, and an “n-cycle” consists of n edges.
This paper will be mostly concerned with “quivers,” which are a particular type of “directed multigraph” (a graph consisting of directed edges, which also allow for multiple edges). A quiver is special in that it strictly prohibits any instances of 1-cycles and 2-cycles.