School of Mathematics and Statistics - Research Publications

Permanent URI for this collection

Search Results

Now showing 1 - 7 of 7
  • Item
    Thumbnail Image
    CERVICAL CYTOLOGY REPORTED AS NEGATIVE AND RISK OF ADENOCARCINOMA OF THE CERVIX - NO STRONG EVIDENCE OF BENEFIT
    MITCHELL, H ; MEDLEY, G ; GORDON, I ; GILES, G (NATURE PUBLISHING GROUP, 1995-04)
    The relationship between negative cervical cytology reports and risk of adenocarcinoma of the cervix was evaluated in a case-control study of 113 cases and 452 controls. All cases and controls had received at least two negative cytology reports. There was no significant difference between the cases and controls in the number of negative cytology reports or in history of cervical abnormality; while a test for trend in the time since last negative cytology report was significant (P < 0.001), the estimated benefit was very modest. Although the estimates of relative protection were higher in women aged less than 35 years than in women aged 35-69 years, this difference was not statistically significant. These results suggest that cervical screening as practised in the 1970s and 1980s was much less effective in preventing adenocarcinoma than squamous carcinoma of the cervix.
  • Item
    Thumbnail Image
    EFFICIENT POOLING DESIGNS FOR LIBRARY SCREENING
    BRUNO, WJ ; KNILL, E ; BALDING, DJ ; BRUCE, DC ; DOGGETT, NA ; SAWHILL, WW ; STALLINGS, RL ; WHITTAKER, CC ; TORNEY, DC (ACADEMIC PRESS INC ELSEVIER SCIENCE, 1995-03-01)
    We describe efficient methods for screening clone libraries, based on pooling schemes that we call "random k-sets designs." In these designs, the pools in which any clone occurs are equally likely to be any possible selection of k from the v pools. The values of k and v can be chosen to optimize desirable properties. Random k-sets designs have substantial advantages over alternative pooling schemes: they are efficient, flexible, and easy to specify, require fewer pools, and have error-correcting and error-detecting capabilities. In addition, screening can often be achieved in only one pass, thus facilitating automation. For design comparison, we assume a binomial distribution for the number of "positive" clones, with parameters n, the number of clones, and c, the coverage. We propose the expected number of resolved positive clones--clones that are definitely positive based upon the pool assays--as a criterion for the efficiency of a pooling design. We determine the value of k that is optimal, with respect to this criterion, as a function of v, n, and c. We also describe superior k-sets designs called k-sets packing designs. As an illustration, we discuss a robotically implemented design for a 2.5-fold-coverage, human chromosome 16 YAC library of n = 1298 clones. We also estimate the probability that each clone is positive, given the pool-assay data and a model for experimental errors.
  • Item
    Thumbnail Image
    Optimal pooling designs with error detection
    Balding, DJ ; Torney, DC (ACADEMIC PRESS INC JNL-COMP SUBSCRIPTIONS, 1996-04)
    Consider a collection of objects, some of which may be `bad', and a test which determines whether or not a given sub-collection contains no bad objects. The non-adaptive pooling (or group testing) problem involves identifying the bad objects using the least number of tests applied in parallel. The `hypergeometric' case occurs when an upper bound on the number of bad objects is known {\em a priori}. Here, practical considerations lead us to impose the additional requirement of {\em a posteriori} confirmation that the bound is satisfied. A generalization of the problem in which occasional errors in the test outcomes can occur is also considered. Optimal solutions to the general problem are shown to be equivalent to maximum-size collections of subsets of a finite set satisfying a union condition which generalizes that considered by Erd\"os \etal \cite{erd}. Lower bounds on the number of tests required are derived when the number of bad objects is believed to be either 1 or 2. Steiner systems are shown to be optimal solutions in some cases.
  • Item
    Thumbnail Image
    Optimal labelling of unit interval graphs
    Jinjiang, Y ; Sanming, Z (Springer Science and Business Media LLC, 1995-09)
  • Item
  • Item
    Thumbnail Image
    MATROID TREE GRAPHS AND INTERPOLATION THEOREMS
    ZHOU, SM (ELSEVIER SCIENCE BV, 1995-01-20)
  • Item
    Thumbnail Image
    On f-domination number of a graph
    Zhou, SM (CZECHOSLOVAK MATHEMATICAL JOURNAL, 1996)