Regular matroidIn mathematics, a regular matroid is a matroid that can be represented over all fields. A matroid is defined to be a family of subsets of a finite set, satisfying certain axioms. The sets in the family are called "independent sets". One of the ways of constructing a matroid is to select a finite set of vectors in a vector space, and to define a subset of the vectors to be independent in the matroid when it is linearly independent in the vector space.
Matroid oracleIn mathematics and computer science, a matroid oracle is a subroutine through which an algorithm may access a matroid, an abstract combinatorial structure that can be used to describe the linear dependencies between vectors in a vector space or the spanning trees of a graph, among other applications. The most commonly used oracle of this type is an independence oracle, a subroutine for testing whether a set of matroid elements is independent.
Matroid rankIn the mathematical theory of matroids, the rank of a matroid is the maximum size of an independent set in the matroid. The rank of a subset S of elements of the matroid is, similarly, the maximum size of an independent subset of S, and the rank function of the matroid maps sets of elements to their ranks. The rank function is one of the fundamental concepts of matroid theory via which matroids may be axiomatized. Matroid rank functions form an important subclass of the submodular set functions.
MatroïdeEn mathématiques, et plus particulièrement en combinatoire, un matroïde est une structure introduite comme un cadre général pour le concept d'indépendance linéaire. Elle est donc naturellement liée à l'algèbre linéaire (déjà au niveau du vocabulaire : indépendant, base, rang), mais aussi à la théorie des graphes (circuit, cycle), à l'algorithmique (algorithme glouton), et à la géométrie (pour diverses questions liées à la représentation). La notion a été introduite en 1935 par Whitney. Le mot matroïde provient du mot matrice.
Vámos matroidIn mathematics, the Vámos matroid or Vámos cube is a matroid over a set of eight elements that cannot be represented as a matrix over any field. It is named after English mathematician Peter Vámos, who first described it in an unpublished manuscript in 1968. The Vámos matroid has eight elements, which may be thought of as the eight vertices of a cube or cuboid. The matroid has rank 4: all sets of three or fewer elements are independent, and 65 of the 70 possible sets of four elements are also independent.
Graphic matroidIn the mathematical theory of matroids, a graphic matroid (also called a cycle matroid or polygon matroid) is a matroid whose independent sets are the forests in a given finite undirected graph. The dual matroids of graphic matroids are called co-graphic matroids or bond matroids. A matroid that is both graphic and co-graphic is sometimes called a planar matroid (but this should not be confused with matroids of rank 3, which generalize planar point configurations); these are exactly the graphic matroids formed from planar graphs.
Plan de Fanothumb|Une représentation du plan de Fano (les six segments et le cercle représentent les 7 droites). En géométrie projective finie, le plan de Fano, portant le nom du mathématicien Gino Fano, est le plus petit plan projectif fini, c'est-à-dire celui comportant le plus petit nombre de points et de droites, à savoir 7 de chaque. C'est le seul plan projectif (au sens des axiomes d'incidence) de 7 points, et c'est le plan projectif sur le corps fini à deux éléments.
