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On Existence of Distinct Representative Sets for Subsets of a Finite Set

Published online by Cambridge University Press:  20 November 2018

G. F. Clements*
Affiliation:
University of Colorado, Boulder, Colorado
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Let S be a finite set and let S1, S2, …, St be subsets of S, not necessarily distinct. Does there exist a set of distinct representatives (SDR) for S1, S2, …, St? That is, does there exist a subset {a1, a2, …, at} of S such that aiSi, 1 ≦ it, and aiaj if ij? The following theorem of Hall [2; 6, p. 48] gives the answer.

THEOREM. The subsets S1, S2, …, St have an SDR if and only if for each s, 1 ≦ st, |Si1Si1 ∪ … ∪ Sis| ≧ s for each s-comhination {i1, i2, …, is} of the integers 1, 2, …, t.

(Here and below, |A| denotes the number of elements in A.)

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1970

References

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