In combinatorics|lang=en terms the difference between matroid and coloop
is that matroid is (combinatorics) a structure that captures the essence of a notion of "independence" that generalizes linear independence in vector spaces while coloop is (combinatorics) an element in a matroid that belongs to no circuit or (equivalently) belongs to every basis.
As nouns the difference between matroid and coloop
is that matroid is (combinatorics) a structure that captures the essence of a notion of "independence" that generalizes linear independence in vector spaces while coloop is (combinatorics) an element in a matroid that belongs to no circuit or (equivalently) belongs to every basis.
matroid
Noun
(
en noun)
(combinatorics) A structure that captures the essence of a notion of "independence" that generalizes linear independence in vector spaces.
coloop
English
Noun
(
en noun)
(combinatorics) An element in a matroid that belongs to no circuit or (equivalently) belongs to every basis. 