Small values of Carmichael's lambda function
Abstract
Let λ(n) be the exponent of the multiplicative group (Z/nZ)×, and set L(x,y) = \#\n x: λ(n) y\. We prove an upper bound for L(x,y)x valid for ((2x)1+ε) y x/((2x)1+ε). Our bound is asymptotically sharp under a plausible hypothesis on powersmooth shifted primes. As an application, we obtain a new upper bound on the count of odd n x for which the order of 2 modulo n is appreciably smaller than x1/2.
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