Divisibility of class numbers of quadratic fields and a conjecture of Iizuka
Abstract
Assume x,\ y,\ n are positive integers and n is odd. In this note, we show that the class number of the imaginary quadratic field Q(x2-yn) is divisible by n for fixed x, n if (2x,y)=1 and y>C where C is a constant depending only on x and n. Based on this result, for any odd integer n and any positive integer m, we construct an infinite family of m+1 successive imaginary quadratic fields Q(d), Q(d+12), ·s, Q(d+m2) (d∈ Z) whose class numbers are all divisible by n.
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