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Order computations in generic groups

by Andrew V. Sutherland - PHD THESIS MIT, SUBMITTED JUNE 2007. RESOURCES , 2007
"... ..."
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Fast Bounds on the Distribution of Smooth Numbers ⋆

by Scott T. Parsell, Jonathan P. Sorenson
"... Abstract. Let P(n) denote the largest prime divisor of n, andlet Ψ(x,y) be the number of integers n ≤ x with P(n) ≤ y. Inthispaper we present improvements to Bernstein’s algorithm, which finds rigorous upper and lower bounds for Ψ(x,y). Bernstein’s original algorithm runs in time roughly linear in ..."
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Abstract. Let P(n) denote the largest prime divisor of n, andlet Ψ(x,y) be the number of integers n ≤ x with P(n) ≤ y. Inthispaper we present improvements to Bernstein’s algorithm, which finds rigorous upper and lower bounds for Ψ(x,y). Bernstein’s original algorithm runs in time roughly linear in y. Our first, easy improvement runs in time roughly y 2/3. Then, assuming the Riemann Hypothesis, we show how to drastically improve this. In particular, if log y is a fractional power of log x, which is true in applications to factoring and cryptography, then our new algorithm has a running time that is polynomial in log y, and gives bounds as tight as, and often tighter than, Bernstein’s algorithm. 1

unknown title

by Arie Leizarowitz , 2009
"... Iterated logarithm approximations to the distribution of the largest prime divisor ..."
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Iterated logarithm approximations to the distribution of the largest prime divisor