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1 results

  • On a conjecture of Crittenden and Vanden Eynden concerning coverings by arithmetic progressions

  • Part of
  • R. J. Simpson
  • Journal:
    Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics / Volume 63 / Issue 3 / December 1997
    Published online by Cambridge University Press:
    09 April 2009, pp. 396-420
    Print publication:
    December 1997
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  • Crittenden and Vanden Eynden conjectured that if n arithmetic progressions, each having modulus at least k, include all the integers from 1 to k2n-k+1, then they include all the integers. They proved this for the cases k = 1 and k = 2. We give various necessary conditions for a counterexample to the conjecture; in particular we show that if a counterexample exists for some value of k, then one exists for that k and a value of n less than an explicit function of k.