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Determination of a Subset from Certain Combinatorial Properties

Published online by Cambridge University Press:  20 November 2018

David G. Cantor  and
W. H. Mills
David G. Cantor
Affiliation:
Institute for Defense Analyses, Princeton, New Jersey and University of Washington
W. H. Mills
Affiliation:
Institute for Defense Analyses, Princeton, New Jersey and University of Washington
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Let N be a finite set of n elements. A collection ﹛S1, S2, … , Sm﹜ of subsets of N is called a determining collection if an arbitrary subset T of N is uniquely determined by the cardinalities of the intersections SiT, 1 ≤ im. The purpose of this paper is to study the minimum value D(n) of m for which a determining collection of m subsets exists.

This problem can be expressed as a coin-weighing problem (1; 7).

In a recent paper Cantor (1) showed that D(n) = O(n/log log n), thus proving a conjecture of N. J. Fine (3) that D(n) = o(n). More recently Erdös and Rényi (2), Söderberg and Shapiro (7), Berlekamp, Mills, and Leo Moser have independently found proofs that D(n) = O(n/log n).

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 18 , 1966 , pp. 42 - 48
Copyright
Copyright © Canadian Mathematical Society 1966

References

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7. Söderberg, Staffan and Shapiro, H. S., A combinatory detection problem, Amer. Math. Monthly, 70 (1963), 10661070.Google Scholar