hypervertex

As nouns the difference between terms and hypervertex

is that terms is while hypervertex is (graph theory) the equivalent of a graph's vertex in a hypergraph.

As nouns the difference between hypergraph and hypervertex

is that hypergraph is (mathematics) a generalization of a graph, in which edges can connect any number of vertices while hypervertex is (graph theory) the equivalent of a graph's vertex in a hypergraph.

In graph theory terms the difference between vertex and hypervertex

is that vertex is one of the elements of a graph joined or not by edges to other vertices while hypervertex is the equivalent of a graph's vertex in a hypergraph.

As nouns the difference between vertex and hypervertex

is that vertex is the highest point of something while hypervertex is the equivalent of a graph's vertex in a hypergraph.

In graph theory terms the difference between graph and hypervertex

is that graph is an ordered pair $(V,E)$, where $V$ is a set of elements called vertices (or nodes) and $E$ is a set of pairs of elements of $V$, called edges; informally, a set of vertices together with a set edges that join these vertices while hypervertex is the equivalent of a graph's vertex in a hypergraph.

As nouns the difference between graph and hypervertex

is that graph is a diagram displaying data; in particular one showing the relationship between two or more quantities, measurements or indicative numbers that may or may not have a specific mathematical formula relating them to each other while hypervertex is the equivalent of a graph's vertex in a hypergraph.

As a verb graph

is to draw a graph.