On the equations x2-2py2 = -1, 2
Abstract
Let E∈\-1, 2\. We improve on the upper and lower densities of primes p such that the equation x2-2py2=E is solvable for x, y∈ Z. We prove that the natural density of primes p such that the narrow class group of the real quadratic number field Q(2p) has an element of order 16 is equal to 164. We give an application of our results to the distribution of Hasse's unit index for the CM-fields Q(2p, -1). Our results are consequences of a twisted joint distribution result for the 16-ranks of class groups of Q(-p) and Q(-2p) as p varies.
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