As nouns the difference between hypergraph and multigraph
is that
hypergraph is a generalization of a graph, in which edges can connect any number of vertices while
multigraph is a set
V (whose elements are called {{term|vertex|vertices}} or {{term|node|nodes}}), taken together with a multiset
E, each of whose elements (called an {{term|edge}} or {{term|line}}) is a cardinality-two multisubset of
V.
As nouns the difference between multigraph and o
is that
multigraph is a set
V (whose elements are called {{term|vertex|vertices}} or {{term|node|nodes}}), taken together with a multiset
E, each of whose elements (called an {{term|edge}} or {{term|line}}) is a cardinality-two multisubset of
V while
o is a zero used in reading out numbers.
As an interjection o is
the English vocative particle, used before a pronoun or the name of a person or persons to mark direct address.
As a particle O is
The English vocative particle, used for direct address.As an abbreviation O is
the number of overs bowled.
taxonomy | multigraph |
As nouns the difference between taxonomy and multigraph
is that
taxonomy is the science or the technique used to make a classification while
multigraph is a set
V (whose elements are called {{term|vertex|vertices}} or {{term|node|nodes}}), taken together with a multiset
E, each of whose elements (called an {{term|edge}} or {{term|line}}) is a cardinality-two multisubset of
V.
multidigraph | multigraph | Hyponyms |
Multigraph is a hypernym of multidigraph.
Multigraph is a hyponym of multidigraph.
As nouns the difference between multidigraph and multigraph
is that
multidigraph is a directed graph that is permitted to have multiple arcs connecting the same source and target nodes while
multigraph is a set
V (whose elements are called {{term|vertex|vertices}} or {{term|node|nodes}}), taken together with a multiset
E, each of whose elements (called an {{term|edge}} or {{term|line}}) is a cardinality-two multisubset of
V.
submultigraph | multigraph | Related terms |
Submultigraph is a related term of multigraph.
As a noun multigraph is
(mathematics|graph theory) a set
v (whose elements are called (
term) or (
term)), taken together with a multiset
e, each of whose elements (called an (
edge) or (
line)) is a cardinality-two multisubset of
v.
multisubgraph | multigraph | Related terms |
Multisubgraph is a related term of multigraph.
As a noun multigraph is
(mathematics|graph theory) a set
v (whose elements are called (
term) or (
term)), taken together with a multiset
e, each of whose elements (called an (
edge) or (
line)) is a cardinality-two multisubset of
v.
subset | multigraph |
As nouns the difference between subset and multigraph
is that
subset is with respect to another set, a set such that each of its elements is also an element of the other set while
multigraph is a set
V (whose elements are called {{term|vertex|vertices}} or {{term|node|nodes}}), taken together with a multiset
E, each of whose elements (called an {{term|edge}} or {{term|line}}) is a cardinality-two multisubset of
V.
multisubset | multigraph |
As nouns the difference between multisubset and multigraph
is that
multisubset is a subset that is a multiset, ie one in which a given element can occur more than once while
multigraph is (mathematics|graph theory) a set
v (whose elements are called (
term) or (
term)), taken together with a multiset
e, each of whose elements (called an (
edge) or (
line)) is a cardinality-two multisubset of
v.
cardinality | multigraph |
As nouns the difference between cardinality and multigraph
is that
cardinality is (set theory) of a set, the number of elements it contains while
multigraph is (mathematics|graph theory) a set
v (whose elements are called (
term) or (
term)), taken together with a multiset
e, each of whose elements (called an (
edge) or (
line)) is a cardinality-two multisubset of
v.
multiset | multigraph |
As nouns the difference between multiset and multigraph
is that
multiset is (set theory) a generalization of a set: a container, in which, unlike for set, an element can be present multiple times while
multigraph is (mathematics|graph theory) a set
v (whose elements are called (
term) or (
term)), taken together with a multiset
e, each of whose elements (called an (
edge) or (
line)) is a cardinality-two multisubset of
v.
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