Abstract
Pooling desings have previously been used for the efficient identification of distinguished elements of a finite setU. Group testing underlies these designs: For any\(S \subseteq U\), a binary result is obtainable, indicating whether or not the number of distinguished elements included inS is zero. The current generalization of pooling designs will enable the efficient identification of distinguished subsets of a finite setU. In this case, for any\(S \subseteq U\), a binary result is obtainable, indicating whether or not the number of distinguished subsets included inS is zero. Such designs are called sets pooling designs, comprising standard pooling designs in the special case where all the distinguished subsets are elements. The new designs are similar to the standard designs but are subject to new constraints because the set of subsets included inS is its power set. To illustrate the feasibility of constructing sets pooling designs, random, non-adaptive designs are investigated for the special case where all distinguished subsets have the same size. An optimum probability for including an object in a pool is approximated as a function of the size and number of distinguished subsets, adopting the criterion of minimizing the average number of non-distinguished subsets whose status would not be resolved by the pooling design. Deterministic and adaptive designs are also described.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
I. Anderson, Combinatorics of Finite Sets, Clarendon Press, Oxford, 1987.
D.J. Balding, W.J. Bruno, E. Knill, and D.C. Torney, A comparative survey of non-adaptive pooling designs, In: Genetic Mapping and DNA Sequencing, IMA Volumes in Mathematics and its Applications, Vol. 81, Springer-Verlag, 1996, pp. 133–154.
D.J. Balding and D.C. Torney, Optimal pooling designs with error detection, J. Combin. Theory, Ser. A74 (1996) 131–140.
E. Barillot, B. Lacroix, and D. Cohen, Theoretical analysis of library screening using an-dimensional pooling strategy, Nucl. Acids Res.19 (1991) 6241–6247.
W.J. Bruno, E. Knill, D.J. Balding, D.C. Bruce, N.A. Doggett, W.W. Sawhill, R.L. Stallings, C.C. Whittaker, and D.C. Torney, Efficient pooling designs for library screening, Genomics26 (1995) 21–30.
J.P.J. Chong, P. Thömmes, and J.J. Blow, The role of MCM/P1 proteins in the licensing of DNA replication, Trends in Biochemical Sciences21 (1996) 102–106.
C.J. Colbourn and J.H. Dinitz, CRC Handbook of Combinatorial Designs, CRC Press, Boca Raton, 1996, pp. 564–565.
E.T. Copson, Asymptotic Expansions, Cambridge University Press, Cambridge, 1965.
P. Erdös, P. Frankl, and Z. Füredi, Families of finite sets in which no set is covered by the union of two others, J. Comb. Theory, Ser. A33 (1982) 158–166.
S. Fields, The future is function, Nature Genetics15 (1997) 325–327.
L. Guarante, Transcriptional coactivators in yeast and beyond, Trends in Biochemical Sciences20 (1995) 517–521.
L. Riccio and C.J. Colbourn, Sharper bounds in adaptive group testing, Tiawanese J. Math., in press.
K. Sinha, Personal communication.
J.V. Uspensky, Theory of Equations, McGraw-Hill, New York, 1948.
Author information
Authors and Affiliations
Additional information
This work was supported by the US Department of Energy under contract W-7405-ENG-36, through a Laboratory Directed Research and Development Grant at Los Alamos National Laboratory.
Rights and permissions
About this article
Cite this article
Torney, D.C. Sets pooling designs. Annals of Combinatorics 3, 95–101 (1999). https://doi.org/10.1007/BF01609879
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF01609879