Date
Thu, 01 Dec 2005
16:30
Location
DH Common Room
Speaker
Ron Shail
Organisation
University of Surrey

The Riemann zeta function involves, for Re s>1, the summation of the inverse s-th powers of the integers. A class of zeta-like functions is obtained if the s-th powers of integers which contain specified digits are omitted from the summation. The numerical summation of such series, their convergence properties and analytic continuation are considered in this lecture.

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