Title of article
A unique factorization theorem for matroids
Author/Authors
Crapo، نويسنده , , Henry and Schmitt، نويسنده , , William، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2005
Pages
28
From page
222
To page
249
Abstract
We study the combinatorial, algebraic and geometric properties of the free product operation on matroids. After giving cryptomorphic definitions of free product in terms of independent sets, bases, circuits, closure, flats and rank function, we show that free product, which is a noncommutative operation, is associative and respects matroid duality. The free product of matroids M and N is maximal with respect to the weak order among matroids having M as a submatroid, with complementary contraction equal to N . Any minor of the free product of M and N is a free product of a repeated truncation of the corresponding minor of M with a repeated Higgs lift of the corresponding minor of N . We characterize, in terms of their cyclic flats, matroids that are irreducible with respect to free product, and prove that the factorization of a matroid into a free product of irreducibles is unique up to isomorphism. We use these results to determine, for K a field of characteristic zero, the structure of the minor coalgebra K { M } of a family of matroids M that is closed under formation of minors and free products: namely, K { M } is cofree, cogenerated by the set of irreducible matroids belonging to M .
Keywords
Matroid , Free product , Unique factorization , Minor coalgebra , Cofree coalgebra , Free algebra
Journal title
Journal of Combinatorial Theory Series A
Serial Year
2005
Journal title
Journal of Combinatorial Theory Series A
Record number
1531023
Link To Document