An extension of Boyd's p-adic algorithm for the harmonic series
Abstract
In this paper we will extend a p-adic algorithm of Boyd in order to study the size of the set: \[Jp(y)=\n :Σj=1nyjj 0( p)\.\] Suppose that p is one of the first 100 odd primes and y∈\1,2,...,p-1\, then our calculations prove that |Jp(y)|<∞ in 24240 out of 24578 possible cases. Among other results we show that |J13(9)|=18763. The paper concludes by discussing some possible applications of our method to sums involving Fibonacci numbers.
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