In combinatorial mathematics, an independence system is a pair , where is a finite set and is a collection of subsets of (called the independent sets or feasible sets) with the following properties:
- The empty set is independent, i.e., . (Alternatively, at least one subset of is independent, i.e., .)
- Every subset of an independent set is independent, i.e., for each , we have . This is sometimes called the hereditary property, or downward-closedness.
Another term for an independence system is an abstract simplicial complex.