Finding a maximum cardinality common independent set in two matroids (also
known as Matroid Intersection) is a classical combinatorial optimization
problem, which generalizes several well-known problems, such as finding a
maximum bipartite matching, a maximum colorful forest, and an arborescence in
directed graphs. Enumerating all maximal common independent sets in two (or
more) matroids is a classical enumeration problem. In this paper, we address an
``intersection'' of these problems: Given two matroids and a threshold Ï„,
the goal is to enumerate all maximal common independent sets in the matroids
with cardinality at least Ï„. We show that this problem can be solved in
polynomial delay and polynomial space. We also discuss how to enumerate all
maximal common independent sets of two matroids in non-increasing order of
their cardinalities