Notes on the topology of independence structures
Abstract
Following Welsh, a pre-independence space (pi-space) is a set M together with a non-empty collection I(M) of subsets of M, called independent sets, which is closed under taking subsets, and finite independent sets satisfy the exchange property from matroid theory. We show that I(M), viewed as a poset, is contractible if it is infinite-dimensional, and Cohen-Macaulay otherwise. Moreover, the proper part of the associated poset of flats is also contractible in the infinite-dimensional case, and Cohen-Macaulay otherwise. These results generalize those for independence complexes and geometric lattices of (finite) matroids.
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