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TY - THES AU - Allemann, Andreas TI - Improved upper bounds for several variants of group testing CY - Aachen PB - Publikationsserver der RWTH Aachen University M1 - RWTH-CONV-120900 SP - IV, 48 S. : graph. Darst. PY - 2003 N1 - Aachen, Techn. Hochsch., Diss., 2003 AB - Group testing is a class of search problems, in which we aim to identify all of n items as either good or defective. We may perform tests on arbitrary subsets, which indicate whether the tested group contains only good items or at least one defective. In the (d,n) and generalized (d,n) group testing problems, it is known that the number of defectives is exactly d respectively at most d and we try to minimize the worst case number of tests. In this thesis, we introduce a generalization of these problems by requiring the case of more than d defectives to be detected as well and prove that solving the new problem needs exactly one more test than the (d,n) group testing problem. The major result is a new algorithm for all these problems whose required number of tests is for n/d >= 2 less than 0.255d + 0.5log2 d + 5.5 above the information lower bound. For d >= 10, this is below the best known upper bound of d - 1 additional tests given in the literature. KW - Gruppentesten (SWD) LB - PUB:(DE-HGF)11 DO - DOI:10.18154/RWTH-CONV-120900 UR - https://publications.rwth-aachen.de/record/59084 ER -